tag:blogger.com,1999:blog-34463785797498350952024-02-07T09:20:48.535+01:00Ambroise SuliesActivités d'écriture et autres choses sans importance.Sulieshttp://www.blogger.com/profile/09149402437899363364noreply@blogger.comBlogger101125tag:blogger.com,1999:blog-3446378579749835095.post-20138836963785451482023-04-18T15:48:00.004+01:002023-04-19T08:57:26.252+01:00Chat-GPT fait l'horoscope - 1 Mise en place du protocole expérimental<p style="text-align: right;"><i>par le Dr A. Sulies, de l'Institut d'Habilité Uranien</i></p><p style="text-align: left;"><b><span style="font-family: helvetica; font-size: large;">Introduction</span></b></p><p style="text-align: left;"><span style="font-family: helvetica;">Selon un célèbre savant Marseillais, l'astrologie a plus a nous dire que les modèles mathématiques[1]. De puissants modèles mathématiques se cachent dans les méandres de l'intelligence artificielle. Nous proposons ici de tester les capacités de l'ultime outil chat-GPT dans ce domaine à vous prescrire un horoscope.</span></p><p style="text-align: left;"><b><span style="font-family: helvetica; font-size: large;">Prévisions astrologiques et prévisions par méthode d'apprentissage: </span></b></p><p><span style="font-family: helvetica;">Vous trouverez ci-dessous deux horoscopes. L'un est écrit par chat-GPT, l'autre par le site www.mon-horoscope-du-jour.com, pour le signe de l'auteur de ces lignes, le 18 avril 2023. Twist: je ne vous dis pas lequel est lequel. Seule la forme a été légèrement altérée pour ne pas trahir l'origine de chacun. Les phrases sont véritablement tirées de ces horoscopes.</span></p><p><b><i><span style="font-family: helvetica;">Horoscope 1:</span></i></b></p><p><span style="font-family: helvetica;">Votre climat astral : les étoiles vous offrent une belle dose d'énergie et de motivation. Vous pourriez vous sentir plus confiant que jamais et prêt à relever tous les défis. </span></p><p><span style="font-family: helvetica;">Humeur : Cette semaine, vous vous sentirez plus confiant que jamais. Vous aurez l'impression de pouvoir tout accomplir et vous aurez une attitude positive envers la vie. Profitez de cette énergie pour poursuivre vos objectifs avec détermination.</span></p><p><span style="font-family: helvetica;">Amour : Si vous êtes en couple, c'est le moment idéal pour renouveler votre relation. Prenez le temps de planifier une soirée romantique ou une escapade en amoureux. Si vous êtes célibataire, soyez ouvert aux opportunités de rencontre. Vous pourriez rencontrer une personne spéciale lors d'un événement social ou dans un endroit inhabituel.</span></p><p><span style="font-family: helvetica;">Argent : Les finances pourraient être un peu tendues cette semaine. Essayez de ne pas trop dépenser et évitez les achats impulsifs. Si vous avez des dettes, c'est le moment de mettre en place un plan de remboursement. Faites également attention aux offres trop belles pour être vraies.</span></p><p><span style="font-family: helvetica;">Travail : Vous pourriez rencontrer des obstacles au travail. Restez concentré et n'hésitez pas à demander de l'aide si nécessaire. Vous finirez par surmonter les défis et vous en sortirez plus fort. C'est également le moment idéal pour établir des objectifs professionnels à long terme.</span></p><p><span style="font-family: helvetica;">Loisirs : Prenez du temps pour vous. Faites une activité qui vous passionne ou découvrez quelque chose de nouveau. Cela vous aidera à vous détendre et à vous ressourcer. Vous pourriez également profiter de votre temps libre pour vous connecter avec des amis ou des membres de votre famille.</span></p><p><span style="font-family: helvetica;">Conseil du jour : Ne laissez pas la peur vous retenir. Prenez des risques calculés et explorez de nouveaux horizons. Vous pourriez être surpris des résultats positifs qui en découlent.</span></p><p><b><i><span style="font-family: helvetica;">Horoscope 2 : </span></i></b></p><p><span style="font-family: helvetica;">Votre climat astral : Votre pouvoir d'agir pour améliorer vos conditions de vie est au premier plan. Restez réceptif aux autres. Votre activité s'intensifie, vous devrez vous réserver des plages de détente totale, pour éviter de polluer votre vie privée de votre vie extérieure.</span></p><p><span style="font-family: helvetica;">Humeur: Vous avez l'occasion d'apprendre à dire non sans vous culpabiliser pour autant. C'est une victoire sur vous-même, un pas important vers l'autonomie et la liberté. Vous prenez des risques calculés et cela vous réussit !</span></p><p><span style="font-family: helvetica;">Amour: Sentimentalement, vous trouvez la paix intérieure. Des influences positives vous donnent de la force et du courage. Le chemin pour atteindre le bonheur est proche, vous ne lâchez rien. Jouez la séduction à fond, montrez-vous sexy et charmeur.</span></p><p><span style="font-family: helvetica;">En couple: Si vous attendiez un changement de comportement de la part de votre moitié, ça y est ! Le message est bien passé, vous avez ce que vous espériez. Entre vous une belle évolution est prévue, laissez faire le temps.</span></p><p><span style="font-family: helvetica;">Célibataire: Le ciel est clément sur vos amours, vous devriez même recevoir des nouvelles d'une personne que vous avez aimée. Vous aurez libre choix entre continuer à échanger avec elle ou pas. Dans les deux cas, tout ira bien pour vous.</span></p><p><span style="font-family: helvetica;">Argent: Vous sortez de vos gonds trop rapidement, aujourd'hui, surtout si vous devez négocier. Votre naturel est beaucoup trop vif. Vous serez tenté de vous relâcher totalement, de soulager vos pulsions par rapport aux achats... Attention, ils ne sont pas tous utiles !</span></p><p><span style="font-family: helvetica;">Travail: Ne cherchez pas à forcer le passage. Vous n'êtes pas en état de revendiquer quoi que ce soit et en outre, vos pensées sont ailleurs. Vous tirez les conclusions des initiatives prises et vous préparez celles à venir.</span></p><p><span style="font-family: helvetica;">Loisirs: Essayez de vous détendre mais ne restez pas non plus inactif. Un peu de sport ou de relaxation contribueraient à rétablir l'équilibre et à mieux répartir vos énergies. Qui a dit que vous boudiez les exercices physiques ?</span></p><p><span style="font-family: helvetica;">Notre conseil du jour: Si les choses n'avancent pas aussi vite que vous l'aviez prévu, le mieux à faire est de mettre en suspens tous vos projets amoureux. Attendez encore un peu et tout ira mieux, le temps est votre ami.</span></p><p><span style="font-family: helvetica; font-size: large;">Protocole expérimental.</span></p><p><span style="font-family: helvetica;">A la lecture de ces deux textes, nous vous demandons de vous exprimer au travers d'un sondage:</span></p><p><a href="https://www.askabox.fr/repondre.php?s=454021&r=SPu5VcHt4C8z"><span style="font-family: helvetica;">https://www.askabox.fr/repondre.php?s=454021&r=SPu5VcHt4C8z</span></a></p><p><span style="font-family: helvetica;">Une analyse des résultats sera exécutées avec la plus grande attention par l'astrologue en chef de l'IHU qui décidera alors si nos prochains horoscopes seront écrit par des astrologues, ou si nous pouvons tous les licencier (sauf le chef) pour les remplacer par de simples lignes de prompt chat-GPT.</span></p><p><span style="font-family: helvetica; font-size: large;">Références</span></p><p><span style="font-family: helvetica;">[1] https://www.radiofrance.fr/franceinter/podcasts/antidote/antidote-du-vendredi-13-mai-2022-2986060</span></p>Sulieshttp://www.blogger.com/profile/09149402437899363364noreply@blogger.com0tag:blogger.com,1999:blog-3446378579749835095.post-27232263482394173642022-01-04T13:17:00.002+01:002022-01-04T13:18:53.529+01:00Noël 2021: L'âne, le bœuf, et la souris géante<div class="separator" style="clear: both;">
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<i><div style="text-align: center;"><i>L'âne, le bœuf, et la souris géante</i></div></i>Sulieshttp://www.blogger.com/profile/09149402437899363364noreply@blogger.com0tag:blogger.com,1999:blog-3446378579749835095.post-32449960944375076692021-12-16T18:06:00.003+01:002021-12-16T18:06:27.527+01:00Noël 2021. Quelque chose me dit que ça va être galère cette année encore...
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Sulieshttp://www.blogger.com/profile/09149402437899363364noreply@blogger.com0tag:blogger.com,1999:blog-3446378579749835095.post-54617307878905159732020-10-09T09:25:00.000+01:002020-10-09T09:25:09.786+01:00#LPPR : La Pétanque Pour la Recherche
#LPPR: La pétanque pour la recherche.
La recherche en France est tellement mal financée que le CNRS a besoin de dons des clubs de pétanque!
<div class="separator" style="clear: both;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhj1TZqIvIhosP62yXzjKZysgbSDHYhhF5bTWvGq4ilfe3BiCoKefDdFS_wGQo3YaX1LURER10UEGy1-qHJSplTaiVJSyIc84R-fIkvJDV_XgVxZaHIxtKUKRtxgIiiiJxc6pxHnpuCKgHA/s600/CapturePetanque.PNG" style="display: block; padding: 1em 0; text-align: center; "><img alt="" border="0" width="400" data-original-height="600" data-original-width="600" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhj1TZqIvIhosP62yXzjKZysgbSDHYhhF5bTWvGq4ilfe3BiCoKefDdFS_wGQo3YaX1LURER10UEGy1-qHJSplTaiVJSyIc84R-fIkvJDV_XgVxZaHIxtKUKRtxgIiiiJxc6pxHnpuCKgHA/s400/CapturePetanque.PNG"/></a></div>
Sulieshttp://www.blogger.com/profile/09149402437899363364noreply@blogger.com0tag:blogger.com,1999:blog-3446378579749835095.post-43446676999594119402020-09-15T07:02:00.001+01:002020-09-15T07:02:25.651+01:00Comment Emmanuel Macron a-t-il trouvé l'inspiration pour le nom de son mouvement ?<p> </p><p></p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhBx5R5R47-iDPXi_aR6V2N6bS3AtgBESWzq4hJIAb2jmAyh5gOQowNbW96UVQFaKxB0as6-E8GLDBxRhXCynVZfyCb_dBp_Qau5JATkEfoz2PNQbBRWrVr31IuSinlPkgK9fQtzEy5gUxN/s1964/macron-astrapi.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img alt="En février 1993, Emmanuel Macron avait 15 ans. Il lisait les astrapi de sa soeur Estelle, quand il n'était pas au cours de théatre de Brigitte Trogneux. Dans un numéro d'Astrapi, un député se faisait élire sous l'étiquette "mouvement du mieux en marche". Merci Astrapi." border="0" data-original-height="1389" data-original-width="1964" height="443" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhBx5R5R47-iDPXi_aR6V2N6bS3AtgBESWzq4hJIAb2jmAyh5gOQowNbW96UVQFaKxB0as6-E8GLDBxRhXCynVZfyCb_dBp_Qau5JATkEfoz2PNQbBRWrVr31IuSinlPkgK9fQtzEy5gUxN/w625-h443/macron-astrapi.jpg" title="Merci Astrapi." width="625" /></a></div><br /> <p></p>Sulieshttp://www.blogger.com/profile/09149402437899363364noreply@blogger.com0tag:blogger.com,1999:blog-3446378579749835095.post-51138753698732951592020-04-10T08:24:00.001+01:002020-04-10T08:24:06.539+01:00Le protocole Sulies contre le COVID-n<i>Par Ambroise Sulies, Docteur de l'Université de Marseilleu, Laboratoire de Gouroulogie Déguisée.</i><br />
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjGajEGlOI8sMcAkonDCh66Xu44DMF92frS0zTPK_zgYIQvTqmxydkvrHpTJ6_pCz6DWVxKbxii9OxvKmdtOJ_uWLmNQBu8duXJsU2iNG_Ma-J6QlPYjAhQ_b42-MNF1iS5M6Hy7D0alMyd/s1600/Portrait_Michel_Angello_crp.png" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"><img border="0" data-original-height="801" data-original-width="546" height="200" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjGajEGlOI8sMcAkonDCh66Xu44DMF92frS0zTPK_zgYIQvTqmxydkvrHpTJ6_pCz6DWVxKbxii9OxvKmdtOJ_uWLmNQBu8duXJsU2iNG_Ma-J6QlPYjAhQ_b42-MNF1iS5M6Hy7D0alMyd/s200/Portrait_Michel_Angello_crp.png" width="136" /></a>Il serait irresponsable de ne pas appliquer sur le champ ce protocole que je viens d'inventer et que j'ai testé sur mes proches (à l'exclusion d'un cousin gravement atteint). Je peux vous dire que j'ai eu 100% de guérisons.<br />
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Je voudrais insister sur le fait que je suis un expert. La preuve, c'est que j'ai un titre de Docteur, et que je viens d'un laboratoire prestigieux, dans la plus grande université francophone (de Provence). Par ailleurs, je porte une blouse et une belle barbe blanche, ce que vous pouvez constatez sur le portrait ci-joint, réalisé par Michel Angello (tout le monde ne s'est pas fait faire le portrait par lui, je me permets de vous le signaler au passage). Le fait que malgré les sombres casseroles m'ont été imputées, je suis toujours en place, prouve bien que je suis irremplaçable. <br />
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Voici donc la procédure à respecter pour suivre le protocole Sulies:<br />
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<ul>
<li>Cas bénins: le traitement consiste en un verre d'eau sucrée tiède matin et soir, et du repos. Je vous assure que vous irez mieux en une à deux semaines, dans l'immense majorité des cas.</li>
<li>Le protocole Sulies est sans effets secondaires (sauf si vous êtes diabétique, auquel cas, retirez le sucre. Ou si votre eau est impropre à la consommation, dans ce cas achetez de l'eau minérale).</li>
<li>Pour les cas graves, ou en cas d’aggravation, allez à l'hôpital ou consultez les professionnels de la santé (mais pas avant, cela alourdirait le système de soin de manière criminelle en cette période).</li>
<li>Dans la mesure du possible, restez chez vous, et si vous sortez, portez un masque. </li>
</ul>
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<br />Sulieshttp://www.blogger.com/profile/09149402437899363364noreply@blogger.com0tag:blogger.com,1999:blog-3446378579749835095.post-73276375869244151092019-12-27T09:49:00.002+01:002019-12-27T09:49:21.088+01:00Quitte à faire dans le merveilleux...<br />
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Quitte à faire dans le merveilleux...</div>
Sulieshttp://www.blogger.com/profile/09149402437899363364noreply@blogger.com0tag:blogger.com,1999:blog-3446378579749835095.post-21073837056965670522019-12-06T17:16:00.002+01:002019-12-06T17:16:40.884+01:00Des fois, il vaut mieux se taire...Quand ton ministère de tutelle essaye de casser la grève au travers d'une communication institutionnelle et hiérarchique pour te rassurer, mais en te promettant une pension bien plus faible que celle à laquelle tu es en droit de t'attendre :<br />
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<img alt="" height="41" 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" 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Le gouvernement devrait penser à changer de chargés de com... <br />
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Sulieshttp://www.blogger.com/profile/09149402437899363364noreply@blogger.com1tag:blogger.com,1999:blog-3446378579749835095.post-27972892278645204652019-10-13T12:27:00.000+01:002019-10-13T12:27:12.201+01:00Bumper sticker pour physicien...<br />
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<a href="https://scontent-cdt1-1.xx.fbcdn.net/v/t1.0-9/73034839_1658988137564645_8997952044123815936_o.jpg?_nc_cat=108&_nc_eui2=AeFzvt2YI00bWHyGCrtGAnsTvvTlGcN25sg8Nk20Q1opL3SiT1Xc13fP2yXYbCAlQ4OYo3q0QPavSH3Py38n3ca3WvCVbznz-x-BK1kvTAImFA&_nc_oc=AQkoVtgrBYrKGspkkaMjQgeVQEs8xKO9ov0NZrIIJGzryxwWqQQyfDVQDmvjQqpSuJMsPWSXAt7RoMfJe6ZlpsNT&_nc_ht=scontent-cdt1-1.xx&oh=1c1b85461598a5a20904907b5b4dee7b&oe=5E300E6C" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="600" data-original-width="800" height="240" src="https://scontent-cdt1-1.xx.fbcdn.net/v/t1.0-9/73034839_1658988137564645_8997952044123815936_o.jpg?_nc_cat=108&_nc_eui2=AeFzvt2YI00bWHyGCrtGAnsTvvTlGcN25sg8Nk20Q1opL3SiT1Xc13fP2yXYbCAlQ4OYo3q0QPavSH3Py38n3ca3WvCVbznz-x-BK1kvTAImFA&_nc_oc=AQkoVtgrBYrKGspkkaMjQgeVQEs8xKO9ov0NZrIIJGzryxwWqQQyfDVQDmvjQqpSuJMsPWSXAt7RoMfJe6ZlpsNT&_nc_ht=scontent-cdt1-1.xx&oh=1c1b85461598a5a20904907b5b4dee7b&oe=5E300E6C" width="320" /></a></div>
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... vu lors d'une "fête de la science". </div>
Sulieshttp://www.blogger.com/profile/09149402437899363364noreply@blogger.com0tag:blogger.com,1999:blog-3446378579749835095.post-34034096163712152592019-09-17T08:21:00.001+01:002019-09-17T08:21:23.319+01:00S'installe en quelques secondes...<br />
Magnifique produit qui s'installe en quelques secondes...<br />
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEi2z_XwFRQKUfoVVHwaN1oReE0fI_DeaWXGaAkBu5Gl9o74Dy6weSdUzmm4vfFrqtf_q4qUxiO5JEeW4qeBNLOsjlsG0M1PM7xkGhUViVJD7KHaeCzbzzobwsPGYj6PI5R0Nh1iJDsD8V6t/s1600/blog_badcom_lastlonger.PNG" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="630" data-original-width="615" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEi2z_XwFRQKUfoVVHwaN1oReE0fI_DeaWXGaAkBu5Gl9o74Dy6weSdUzmm4vfFrqtf_q4qUxiO5JEeW4qeBNLOsjlsG0M1PM7xkGhUViVJD7KHaeCzbzzobwsPGYj6PI5R0Nh1iJDsD8V6t/s320/blog_badcom_lastlonger.PNG" width="312" /></a></div>
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... et dure "plus longtemps". Bref c'est garanti, au moins pour quelques minutes.</div>
Sulieshttp://www.blogger.com/profile/09149402437899363364noreply@blogger.com0tag:blogger.com,1999:blog-3446378579749835095.post-46598808288823270272019-06-13T21:58:00.000+01:002019-06-13T21:58:34.669+01:00Une équation de Drake restructurée<i>par le Dr Ambroise Sulies,</i><br />
<i>Maître de Conférence-Chef </i><br />
<i>Département ABEZ (Astrobiologie, Biophysique, Exobiologie et Zooplanétologie). </i><br />
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<i> </i>La question de la vie dans l'univers a de tout temps occupé les esprits humains les plus avisés, qui lui ont ainsi consacré un temps précieux qu'ils auraient pu dédier à des choses plus importantes, comme en témoignent les 554 pages de l'ouvrage de M. Crowe [1].<br />
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F. Drake est connu pour avoir formalisé le problème sous la forme d'une équation cherchant à déterminer le nombre de civilisations avec lesquelles nous pourrions communiquer (ou bien dont nous pourrions détecter les émissions radio). Cette équation est devenue si populaire qu'on peut la voir apparaître sur nos écrans de télévision, comme démontré ci dessous.<br />
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjtpQ_v-whoiUYmJfqJ0pB-oPaORMfhyNXPbdzeIVAbScMOCYw35Ou5ik58nC_Rp73PHU_WZYdojqOhyphenhypheneF0uT5bj4WmqvlWXetGfSNk_xuN2UQtzgvVwuQNlasjcAhyphenhyphenhnJ1eYgVqD0UDjra/s1600/theexpanse_drakeequation_cut.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="365" data-original-width="1170" height="196" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjtpQ_v-whoiUYmJfqJ0pB-oPaORMfhyNXPbdzeIVAbScMOCYw35Ou5ik58nC_Rp73PHU_WZYdojqOhyphenhypheneF0uT5bj4WmqvlWXetGfSNk_xuN2UQtzgvVwuQNlasjcAhyphenhyphenhnJ1eYgVqD0UDjra/s640/theexpanse_drakeequation_cut.png" width="640" /></a></div>
Figure 1: <i>L'équation de Drake, telle qu'elle apparaît à l'écran dans la meilleure série de science-fiction de tous les temps [2].</i><br />
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Grosso modo, cette équation peut être interprétée comme une série de multiplications dont certains facteurs estiment le nombre de planètes dans l'univers, et d'autres la probabilité que la vie se développe sur ces planètes et soit détectable par nous, les créatures les plus importantes de l'univers [3]. <br />
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Cette équation est aussi associée au fameux "paradoxe de Fermi", proposé par le physicien E. Fermi, alors qu'il avait certainement des choses plus importantes à faire à Los Alamos à l'époque. On peut exprimer ce paradoxe ainsi : supposons que tous les facteurs multiplicatifs de Drake soient élevés, alors le nombre de civilisations que nous pouvons détecter devrait être élevé, or nous n'avons rien détecté, ni trouvé aucune trace ou artefact. La solution au paradoxe de Fermi est simple: c'est qu'au moins un des facteurs de l'équation de Drake est très petit. La raison pour cela est l'objet de nombreuses discussions et propositions. S. Webb en recensait 50 dès 2002 [4], mais avec l'inflation, il proposait 72 raisons possibles en 2015. [5]<br />
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Le problème principal de l'équation de Drake est qu'il s'agit d'une multiplication de paramètres dont la valeur est absolument inconnue. Par exemple, quelle est la probabilité que la vie se développe sur une planète ? Ce facteur dépend certainement lui même de nombreux autres! Drake aurait donc pu incorporer bien plus de paramètres dans son équation si il avait été moins paresseux. <br />
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En conséquence, inspiré peut être par la tarte au citron que je dégustai hier soir et répondant à cette qualification, je propose ici de revisiter cette équation afin d'obtenir une équation de Drake déstructuré, ou peut-être mieux, une équation de Drake restructurée.<br />
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La probabilité que la vie se développe, ou bien qu'elle puisse communiquer avec nous, peut dépendre de bien des facteurs. Le nombre d'étoiles abritant la vie (ou la vie communicante), <span style="font-family: "courier new" , "courier" , monospace;">Nvie</span>, peut donc être écrit comme le nombre de planètes dans la Voie Lactée (<span style="font-family: "courier new" , "courier" , monospace;">Nplanètes</span>), multiplié par un certain nombre de facteurs. Nous avons donc :<br />
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<span style="font-family: "courier new" , "courier" , monospace;">Nvie= Nplanètes x P</span><br />
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<span style="font-family: "courier new" , "courier" , monospace;">P= f1 x f2 x f3 ... x fn</span><br />
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Tous les facteurs <span style="font-family: "courier new" , "courier" , monospace;">f1</span> à <span style="font-family: "courier new" , "courier" , monospace;">fn</span> sont potentiellement inconnus. Faisons une approximation audacieuse: ils sont tous égaux à 0.5 ! Cela peut paraître grossier, mais explorons quelques facteurs possibles:<br />
<ul>
<li>La vie a plus de chances de se développer à la surface d'une planète tellurique qu'à celle (inexistante) une planète géante gazeuse. Dans le système solaire, nous en avons quatre de chaque sorte. Sur cette base le facteur 'probabilité' que la planète soit tellurique (et donc favorable à la vie) vaut... 0.5</li>
<li>Certains avancent qu'être dans la "zone habitable" (i.e. la zone où l'eau liquide peut exister) est nécessaire. Dans le système solaire, c'est le cas pour Vénus, la Terre et Mars. Trois planètes sur huit. Au niveau de détail de notre calcul, c'est très proche de 0.5 ! </li>
</ul>
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Donc nous avons adopté<span style="font-family: "courier new" , "courier" , monospace;"> f1=f2=...=0.5</span>. Alors <span style="font-family: "courier new" , "courier" , monospace;">P </span>et en conséquence <span style="font-family: "courier new" , "courier" , monospace;">Nvie </span>dépendent seulement du nombre total de facteurs que nous noterons <span style="font-family: "courier new" , "courier" , monospace;">N </span>selon une équation très simple: <span style="font-family: "courier new" , "courier" , monospace;">P</span> est égal à 0.5 à la puissance <span style="font-family: "courier new" , "courier" , monospace;">N</span>. La figure suivante montre en fonction de <span style="font-family: "courier new" , "courier" , monospace;">N </span>la probabilité <span style="font-family: "courier new" , "courier" , monospace;">P </span>(axe de gauche) ou bien <span style="font-family: "courier new" , "courier" , monospace;">Nvie </span>(axe de droite, en adoptant <span style="font-family: "courier new" , "courier" , monospace;">Nplanètes</span>=1000 milliards, sur la base d'une centaine de milliards d'étoiles dans la Voie Lactée, et d'une dizaine de planètes par système stellaire, chiffres sur lesquels s'entendent, en ordre de grandeur, mes collègues de l'Observatoire Astronomique).<br />
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhSp-Gk4PaYXDsDYFoDRopy0A0GQE9ZcDtGrNxlnqahJj8pD4i6uofvVD_v_yVs-UKG2YxsEN2Yry0uX51X-Bcp9r_AfMlqDAx-VeTQa6mHthZEydarXwOuLYTvLfCZ0I-gx01mhbXzgv8z/s1600/plotbloglifego1_crop2.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="566" data-original-width="547" height="640" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhSp-Gk4PaYXDsDYFoDRopy0A0GQE9ZcDtGrNxlnqahJj8pD4i6uofvVD_v_yVs-UKG2YxsEN2Yry0uX51X-Bcp9r_AfMlqDAx-VeTQa6mHthZEydarXwOuLYTvLfCZ0I-gx01mhbXzgv8z/s640/plotbloglifego1_crop2.png" width="617" /></a></div>
Figure 2: <i>En rouge en lisant l'axe de gauche: Probabilité de développement de la vie en fonction du nombre de facteurs impliqués (selon l'hypothèse que chaque facteur donne 50% de résultats favorables). L'axe de droite donne pour la même courbe le nombre de planète abritant la vie dans la Voie Lactée. En bleu, une ligne horizontale indique le nombre 1. A partir de 40 facteurs, moins de une planète est obtenue, i.e. la Terre est alors la seule planète dans la Galaxie abritant la vie.</i><br />
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Sur la figure, j'ai aussi indiqué une ligne horizontale correspondant à une planète abritant la vie dans notre Galaxie. La probabilité rejoint cette ligne pour quarante paramètres. Autrement dit, si quarante paramètres indépendants affectent la possibilité que la vie se développe sur une planète, alors il n'y en a qu'une sur laquelle c'est arrivé: il n'y a que la Terre [6].<br />
<br />
Quarante paramètres, c'est beaucoup me direz-vous, mais un philosophe disait un jour "C'est beaucoup mais c'est bien peu" [7]. Dans "Rare Earth" [8], P. Ward et D.E. Brownlee, des scientifiques d'un autre acabit que l'auteur de cet article suggèrent que de nombreux facteurs participent en effet à la rareté de la vie sur Terre. En voici quelques uns, qui ont été évoqués dans cet ouvrage ou ailleurs:<br />
<ul>
<li>L'abondance de différents éléments chimiques de l'étoile</li>
<li>La proximité (ou pas) de sources de rayonnement énergétique (trous noirs, étoiles à neutron...)</li>
<li>L'explosion de supernova ou de sursaut gamma à proximité. </li>
<li>Les perturbation gravitationnelles</li>
<li>Le spectre de l'étoile</li>
<li>La température de l'étoile</li>
<li>La masse de l'étoile </li>
<li>La durée de vie de l'étoile</li>
<li>L'activité de l'étoile. Les flambées stellaire seraient probablement néfaste à la vie.</li>
<li>La présence d'une planète géante qui protège des impacts (comme Jupiter pour la Terre)</li>
<li>Les caractéristiques de l'orbite de la planète (stabilité, excentricité,...)</li>
<li>La taille de la planète</li>
<li>La présence d'océans à la surface de la planète</li>
<li>Le pourcentage de surface exposé à l'eau </li>
<li>La présence d'un beau satellite (Notre grosse Lune stabiliserait le climat terrestre)</li>
<li>La tectonique des plaques</li>
<li>La distance entre l'étoile et la planète</li>
<li>le nombre d'extinction de masse (permettant aux nouvelles espèces de se développer)</li>
<li>La probabilité de développer une forme de vie bipède</li>
<li>...</li>
</ul>
Cette liste n'est évidemment pas exhaustive. Ainsi, chacun peut élaborer sa propre estimation du nombre de paramètres pouvant jouer un rôle dans notre problème, et appliquer mon équation de Drake restructurée afin de savoir combien de planètes abritent la vie dans la Galaxie.<br />
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<span style="font-size: x-small;">Notes et Références:</span><br />
<span style="font-size: x-small;"><br /></span>
<br />
<div class="a-size-large a-spacing-none" id="title">
<span style="font-size: x-small;">[1]<span class="a-size-large" id="productTitle"> <u>The Extraterrestrial Life Debate, Antiquity to 1915</u>: A Source Book, M. Crowe, Edition "</span><span class="a-size-large" id="productTitle">University of Notre Dame Press". Si cela ne vous suffit pas, voir aussi l'ouvrage compagnon </span></span></div>
<div class="a-section a-spacing-none">
<span class="a-size-extra-large" id="productTitle" style="font-size: x-small;"><u>The Extraterrestrial Life Debate, 1750-1900</u> pour 720 pages de bonheur en plus.</span><br />
<br />
<span class="a-size-extra-large" id="productTitle" style="font-size: x-small;">[2] Si vous ne savez pas encore qu'il s'agît de "The Expanse", je suis bien désolé pour vous.</span><br />
</div>
<div class="a-section a-spacing-none">
</div>
<div class="a-section a-spacing-none">
<span class="a-size-extra-large" id="productTitle" style="font-size: x-small;">[3] De notre point de vue. </span>
<span class="a-size-large a-color-secondary a-text-normal" id="bookEdition" style="font-size: x-small;"> </span>
</div>
<div class="a-section a-spacing-none">
<span style="font-size: x-small;"><br /></span>
<span style="font-size: x-small;">[4] Dans un livre bien nommé <u><span class="a-size-large" id="productTitle" style="box-sizing: border-box; line-height: 1.3;">If
the Universe Is Teeming With Aliens...Where Is Everybody?: Fifty
Solutions to the Fermi Paradox and the Problem of Extraterrestrial Life</span></u></span><br />
<span style="font-size: x-small;"><br /></span>
<span class="a-size-large" id="productTitle" style="box-sizing: border-box; font-size: x-small; line-height: 1.3;">[5] Dans la seconde édition du précédent. </span><br />
<span style="font-size: x-small;"><u><span class="a-size-large" id="productTitle" style="box-sizing: border-box; line-height: 1.3;"><br /></span></u></span>
<span style="font-size: x-small;"><span class="a-size-large" id="productTitle" style="box-sizing: border-box; line-height: 1.3;">[6] Le même raisonnement peut s'appliquer pour le nombre de planètes sur laquelle la vie devient "communicante", i.e. que nous pouvons détecter; ou bien le nombre de planètes sur lesquelles un système universitaire peut se développer sans s'effondrer sous son poids administratif ; ou bien pour calculer tout autre nombre de planètes identifiées par un critère précis; tant que la probabilité peut se mettre sous la forme du produit de facteurs valant tous autour de 0.5.</span></span><br />
<span style="font-size: x-small;"><br /></span>
<span style="font-size: x-small;">[7] C'était peut-être un chanteur finalement...</span><br />
<span style="font-size: x-small;"><br /></span>
<span style="font-size: x-small;">[8] Le titre exact de l'ouvrage est <u>Rare Earth: Why Complex Life Is Uncommon in the Universe</u><i><b>, </b></i>Edition Copernicus, publié en 2000.</span></div>
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Sulieshttp://www.blogger.com/profile/09149402437899363364noreply@blogger.com0tag:blogger.com,1999:blog-3446378579749835095.post-55949713758160685282019-03-22T17:31:00.000+01:002019-04-02T14:32:41.443+01:00<b>Compte Rendu de la finale départementale du concours “Mon Doctorat en 200 secondes”</b><br />
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<i>Ambroise Sulies (PhD), responsable culture scientifique de l’équipe ExcèsLentTeam du Laboratoire d’Analyse, de l’université Aast-Sorbonne Univ. (ASU).</i><br />
<br />
En tant que responsable de la culture scientifique au Laboratoire d’Analyse de Aast-Sorbonne Université (ASU), je me sentais obligé d’assister à la finale départementale du concours « MD200 », dont le gagnant serait automatiquement qualifié pour la finale régionale, dont le gagnant serait automatiquement qualifié pour la finale nationale, dont le gagnant serait automatiquement qualifié pour la finale européenne, dont le gagnant serait automatiquement qualifié pour la finale mondiale.<br />
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Avant de vous délivrer le compte-rendu de cet évènement, je dois préciser quelques informations concernant ma nouvelle affiliation, notre université étant dorénavant officiellement dénommée « Aast-Sorbonne Univ.». En effet, suite à de longues réflexions, notre cellule de valorisation (le plus gros département de l’université) a suggéré cette modification, rendue possible par l’ouverture d’une antenne dans la commune d’Aast (173 habitants). Ce changement est d’une haute importance stratégique, puisqu’il permet de grignoter quelques places au classement de Shanghai (et indirectement celui de Toulouse). En effet, en dernier lieu, les établissements sont départagés par l’ordre alphabétique[voir note 1].<br />
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Toujours pour des raisons stratégiques, les dirigeants d’ASU, ayant constaté la visibilité du concours « Ma Thèse en 180 secondes » mais l’absence de lauréats de l’établissement, ont récemment décidé de souscrire à un concours totalement plagié sur celui-ci, MD200, « Mon Doctorat en 200 secondes », mais dont le niveau moins exigeant pourrait permettre à nos candidats d’être potentiellement titrés, et ainsi ajouter quelques prix sur nos CV, pages wikipedia, et pages web d’ASU [1].<br />
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La cérémonie commença par un discours d’ouverture donné par le président du collège doctoral. Il nous rappela que le but de la compétition était de récompenser les doctorants sachant nous présenter les sujets ardus de leurs recherche avec éloquence et concision. Ce qu’il fit sans l’une ni l’autre[1].<br />
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Les finalistes défilèrent ensuite chacun à leur tour, nous exposant en moins de 200 secondes des études sur les mystères du cosmos, de la vie, sur les challenges d’aujourd’hui dans le domaine de la santé et de l’environnement, et bien d’autres sujets passionnants, avec force, talent, originalité, et humour. Qui usant de la fable, qui parodiant l’indice sonore d’une grande compagnie de transport et enchaînant avec un « sketch » digne de Chevallier et Laspalès. Qui en chantonnant sur l’air d’une ritournelle éternelle de la chanson française. Certains encore mimèrent leurs travaux ou leurs sujets, les rendant vivants pour un auditoire conquis à leur cause. Chacun se distinguait à sa façon, et à l’applaudimètre, quelques-uns me semblaient se distinguer, pour leurs présentations particulièrement originales, alors que les plus classiques provoquaient un tout petit peu moins d’enthousiasme.<br />
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Le jury était composé de personnalités sélectionnées par le comité d’organisation de l’évènement qui, souhaitant bien se faire voir de leurs tutelles, avaient choisi les dirigeants des dites tutelles[1] : président, vice-président, responsables des services de l’université et de la direction régionale du CNRS. Cette sélection introduisit peut-être un biais dans le jugement du jury puisqu’il était composé principalement d’anciens sages s’étant déconnectés de la recherche depuis bien des années pour se consacrer aux tâches administratives et glorieuses qui sont récompensées dans notre nation par salaire, prime, pouvoir, et fréquence des petits-fours (le tout pleinement justifié par le mérite de ces personnes, en tout cas selon leurs propres critères).<br />
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L’annonce des résultats me laissa perplexe, tout comme plusieurs personnes autour de moi. En effet, le choix des vieillards du jury excluait les candidats et candidates ayant montré le plus d’originalité (une qualité pourtant indispensable dans la recherche, ce que les anciens peuvent naturellement avoir oublié considérant leurs activités actuelles), et encore plus tous ceux qui avaient employé l’humour comme vecteur. Il est bien connu que les personnes maniant l’humour ne sont ni matures ni sérieuses, et Richard Feynmann n’aurait certainement pas eu sa place à ASU. Les 3 prix du jury portèrent sur trois jeunes filles sorties du même moule. Elles étaient habillées de manière plutôt classique et étaient dépourvues de kilogrammes surnuméraires. Leurs présentations se voulaient sérieuses. Puisque nous sommes entre nous, je vous avouerais qu’elles me semblèrent plus ennuyeuse et bêtifiantes que les autres[voir note 2]. À la réflexion, la gagnante du premier prix, dans son tailleur Chanel, sur ses talons Louboutin, avec ses cheveux mi-longs attachés en arrière, semblait un jeune clone de la présidente du jury qui a pu retrouver sa jeunesse par procuration en s’identifiant à cette personne. Quant aux messieurs du jury, qui sait si ces jeunes personnes de leur rappelaient pas leur petite-fille ou leur dernière étudiante. Par une coïncidence bien étonnante, les prix distribués couvraient largement la discipline du président de l’université.<br />
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Les prix furent annoncés l’un après l’autre dans une cérémonie interminable pendant laquelle on fit venir sur scène les différents partenaires du concours pour remettre les cadeaux qu’ils offraient aux gagnants. Une chargée de com typique (grande blonde mieux habillée que le chercheur et la chercheuse moyenne) distribua le dernier exemplaire de la revue de son institut. Des représentants de mutuelles, assurances, banques, paradèrent ensuite pour remettre de petits chèques à trois chiffres. L’université se ridiculisa en offrant à tous les participants une pauvre besace à son insigne. Le premier prix eut un énorme chèque (par la taille) en carton. Les mille euros inscrits sur celui-ci étaient moins grandiose. Le président d’ASU vint se gargariser en offrant aux premiers prix un exemplaire du bel ouvrage de photographies prises sur « son » campus, un livre qui s’identifiait en réalité à un fascicule de com[1]. Pour le réaliser il avait fallu payer cher un photographe talentueux sachant trouver les angles rendant gracieux les sites universitaires, en masquant les tags, les câbles électriques tombant des plafonds, les bureaux couverts de graffiti, les chaises branlantes, les toilettes hors usage, etc. En songeant aux millions d’euros qu’ASU distribue au travers de dispositifs d’excellence sur la base de dossiers peu travaillés, certaines mauvaises langues pourraient se dire qu’en comparaison, les prix dérisoires offerts aux meilleurs doctorants de l’université en disaient long sur la considération des étudiants par les personnes en charge d’ASU[1].<br />
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La soirée prit fin alors que toutes les personnalités jouaient des coudes pour être présentes sur les quelques photographies qui pourraient sortir dans le journal local le lendemain, avant de se déplacer vers un cocktail donné à l’occasion, pendant lequel tout un chacun se livra aux exercices de networking et lobbying habituels, ne délivrant que peu d’attention aux véritables héros du jour : les doctorants.<br />
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<span style="font-size: x-small;"><span style="font-family: "courier new" , "courier" , monospace;">NOTES</span></span><br />
<span style="font-size: x-small;"><span style="font-family: "courier new" , "courier" , monospace;">1) Vous pourrez aisément vérifier qu’une politique tout à fait similaire s’applique dans d’autres universités.</span></span><br />
<span style="font-size: x-small;"><span style="font-family: "courier new" , "courier" , monospace;">2) Pendant le cocktail qui suivit l’évènement, je constatai que plusieurs personnes du public partageaient mon avis. Certaines prononcèrent même le terme « neuneu » au sujet de la performance de la grande gagnante de la soirée.</span></span><br />
<br />Sulieshttp://www.blogger.com/profile/09149402437899363364noreply@blogger.com0tag:blogger.com,1999:blog-3446378579749835095.post-79218339803173272172018-12-27T16:48:00.001+01:002018-12-27T18:37:13.427+01:00Bethléem bloquée par les gilets jaunes!<div style="text-align: center;">
Direct Live:</div>
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Bethléem bloquée par les gilets jaunes!</div>
Sulieshttp://www.blogger.com/profile/09149402437899363364noreply@blogger.com0tag:blogger.com,1999:blog-3446378579749835095.post-26307058307742277372018-10-09T21:46:00.001+01:002018-10-09T22:13:56.600+01:00Quand viser l'excellence rend archaïque Depuis quelques années, l'université de Marseille essaye d'être dans le top 100 du classement de la ville dont je tairais le nom. Pour cela, elle se prétend excellence en distribuant des financement "ex", sur des critères très obscurs, le président envoie des lettres de félicitation au moindre co-auteur d'un article nature, elle encourage systématiquement à faire des demandes ERC. Et elle essaye de se prétendre être similaire à une grande université anglo-saxonne. Sauf que franchement, une rentrée solennelle avec musique classique et une brochette de vieux en tenues académiques, ça fait juste archaïque.<br />
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEizH-gQUEFLxn-nS-hCQ8K2VrlQEKBaPImK4IZ8LCS25I9LzbTeXyMeM8IiEnoCXU55KE33gEttTuh356eFEPSQu-eMXciMHHIbGHDGyOtRRgVw5FcQWGUdA1WcHRf3PgniTkvyHalcy9sn/s1600/amurentreeformelle2018.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="1081" data-original-width="1600" height="432" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEizH-gQUEFLxn-nS-hCQ8K2VrlQEKBaPImK4IZ8LCS25I9LzbTeXyMeM8IiEnoCXU55KE33gEttTuh356eFEPSQu-eMXciMHHIbGHDGyOtRRgVw5FcQWGUdA1WcHRf3PgniTkvyHalcy9sn/s640/amurentreeformelle2018.png" width="640" /></a></div>
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<br />Sulieshttp://www.blogger.com/profile/09149402437899363364noreply@blogger.com0tag:blogger.com,1999:blog-3446378579749835095.post-84520420646502680142018-06-12T10:48:00.003+01:002018-06-12T10:50:15.577+01:00coli-ssimo devient coli-maceCe qui est bien avec <i>Colissimo</i>, c'est qu'on peut suivre en ligne les pérégrinations de son colis quand celui-ci fait du ping-pong entre centres de tri. Par contre, au point de vue rapidité, ce n'est plus colissimo, c'est plutôt <i>Colimace.</i><br />
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjXIjtepbR7wFTfj5PDSRzlgKCl_yyFv08HfU-_wPHJYVGuwNOV3ocGzTWvzuw__JfFJEkukY8onNOx2-LAs5whhtgBRK1hWWlcqSdGyhlGpDaL6VgHDX80iwyWDDjZOUC0mFzctfUxALA7/s1600/colimace.PNG" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="709" data-original-width="701" height="400" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjXIjtepbR7wFTfj5PDSRzlgKCl_yyFv08HfU-_wPHJYVGuwNOV3ocGzTWvzuw__JfFJEkukY8onNOx2-LAs5whhtgBRK1hWWlcqSdGyhlGpDaL6VgHDX80iwyWDDjZOUC0mFzctfUxALA7/s400/colimace.PNG" width="395" /></a></div>
Pour résoudre ce problème, j'ai finalement du écrire à colissimo via un formulaire de contact (en trichant un peu sur le motif, puisque la poste ne souhaite pas trop échanger des missives avec ses clients). Une factrice généreuse a alors bien voulu me contacter directement pour m'expliquer que mon colis avait déjà été envoyé plusieurs fois vers mon centre de tri mais qu'il lui revenait toujours (d'autres colis sont pourtant parvenu à leur but avec la même adresse). J'ai pu m'échapper de la boucle infinie en allant finalement le chercher dans le bureau de poste de cette sympathique personne, dans un bureau de poste qui n'est pas le mien, mais celui d'une commune voisine.<br />
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Après ça, je pense que je peux revenir à ce slogan fameux: "Y a pas écrit la poste".<br />
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<br />Sulieshttp://www.blogger.com/profile/09149402437899363364noreply@blogger.com0tag:blogger.com,1999:blog-3446378579749835095.post-90975180209405579092018-05-29T13:08:00.000+01:002018-05-29T13:08:00.750+01:00Université=Boutique<br />
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Quel est le premier lien que vous trouvez sur le site de cette "grande" université française ? Bien sûr, celui de la boutique. Car la mission de l'université, c'est avant tout de vendre des sweat-shirts.<br />
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<tr><td class="tr-caption" style="text-align: center;">Bandeau du site de l'université AMU d'Aix Marseille.</td></tr>
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Sulieshttp://www.blogger.com/profile/09149402437899363364noreply@blogger.com0tag:blogger.com,1999:blog-3446378579749835095.post-57880897730588075672018-03-30T21:04:00.001+01:002018-03-30T21:04:15.394+01:00Make Cardassia great again ! <div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgKZUVZn-9NhHzHrV1OVKD2Q4XJFiQldFsgh8gN0xJBWR-r-VDO_iM3iD5VD1hBt8ApHBlccVWHaV6zhc55VhL26UJiWl2chfrDPxxKfvflw71XQTf4fOuJQ8835jnvwa7T_RwSUGVV8CFm/s1600/20180330_214828.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="1200" data-original-width="1600" height="300" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgKZUVZn-9NhHzHrV1OVKD2Q4XJFiQldFsgh8gN0xJBWR-r-VDO_iM3iD5VD1hBt8ApHBlccVWHaV6zhc55VhL26UJiWl2chfrDPxxKfvflw71XQTf4fOuJQ8835jnvwa7T_RwSUGVV8CFm/s400/20180330_214828.jpg" width="400" /></a></div>
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<span style="font-size: small;"><i>Mais que fait Donald Trump dans cet épisode de Star Trek ds9 ???</i></span></div>
Sulieshttp://www.blogger.com/profile/09149402437899363364noreply@blogger.com0tag:blogger.com,1999:blog-3446378579749835095.post-34665886418541042072018-03-13T12:56:00.000+01:002018-03-13T12:56:21.789+01:00Participer à l'exploration spatiale...<br />
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEi2D-43AsLjU8h9AGbxcmtnhvQgfHrnGQoh71YcEPHPahWh1S_Q9HXjNSZcYiBa20L5hqt0xoXd_lMbRYLnxXS2_DwnRiumoVGZizbS9yHrd6D6lAjozrMePTj4DsPSFeMIsAb8PBTAQYs0/s1600/sulies_hot_ticket.PNG" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="599" data-original-width="848" height="282" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEi2D-43AsLjU8h9AGbxcmtnhvQgfHrnGQoh71YcEPHPahWh1S_Q9HXjNSZcYiBa20L5hqt0xoXd_lMbRYLnxXS2_DwnRiumoVGZizbS9yHrd6D6lAjozrMePTj4DsPSFeMIsAb8PBTAQYs0/s400/sulies_hot_ticket.PNG" width="400" /></a></div>
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<i>Participer à l'exploration spatiale...</i></div>
<br />Sulieshttp://www.blogger.com/profile/09149402437899363364noreply@blogger.com0tag:blogger.com,1999:blog-3446378579749835095.post-26415366040621300682018-03-07T22:49:00.000+01:002018-03-07T22:49:02.396+01:00Voyons si je capte du wifi depuis le train...<br />
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhF9XflPonso0qz-IUKjb834AxYW48EJ7wdGTDczrGvDmBSYFlciH5aph0z4sJ2dxdavVzH4bEFT00UDn6k8A9Me4jEbYj-mB3k4YvaQxQ6OAoOuGXojXpVz5yD_snGwE-LflIRQPF5jvtx/s1600/train.PNG" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="516" data-original-width="929" height="220" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhF9XflPonso0qz-IUKjb834AxYW48EJ7wdGTDczrGvDmBSYFlciH5aph0z4sJ2dxdavVzH4bEFT00UDn6k8A9Me4jEbYj-mB3k4YvaQxQ6OAoOuGXojXpVz5yD_snGwE-LflIRQPF5jvtx/s400/train.PNG" width="400" /></a></div>
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<i>OK, quelqu'un dans mon TGV a un bon sens de l'humour, ou alors pas de chance dans son couple.</i></div>
Sulieshttp://www.blogger.com/profile/09149402437899363364noreply@blogger.com0tag:blogger.com,1999:blog-3446378579749835095.post-29352020707975010922018-02-01T14:51:00.002+01:002018-02-01T14:51:25.719+01:00Dessinez, c'est gagné (la médaille de l'innovation).<br />
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgp9bnbDCAOSBF8wxL2_VFjoqEnYFU5kcJEsO5yxZl463Ko5tBcYwCwEql6114rJN6KbPglJnI-e0pLVEp1adMBvgaRUT9wFYEsaHBg3ttajGxbo0jnMs2U69DEJTJplMlBEIXmTrg87TYs/s1600/medailleinnovation2014.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="854" data-original-width="444" height="640" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgp9bnbDCAOSBF8wxL2_VFjoqEnYFU5kcJEsO5yxZl463Ko5tBcYwCwEql6114rJN6KbPglJnI-e0pLVEp1adMBvgaRUT9wFYEsaHBg3ttajGxbo0jnMs2U69DEJTJplMlBEIXmTrg87TYs/s640/medailleinnovation2014.jpg" width="329" /></a></div>
Quand le CNRS poste à 2 minutes d'écart une news sur les lauréats de la médaille de l'innovation 2014. Une fois avec des photos, une fois avec des portraits dessinés...<br />
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<br />Sulieshttp://www.blogger.com/profile/09149402437899363364noreply@blogger.com0tag:blogger.com,1999:blog-3446378579749835095.post-28134562014179276722018-02-01T14:39:00.002+01:002018-02-01T14:39:56.828+01:00L'Olive étonne, et m'AMUse.<br />
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjtmcTsTyeM8nP2dhxp3QL3IPKtbdZf91-lAhsOml3MZ6Cw3wxDBbH9UentYMpTtzEz5mrAvTZ54KjxlJ9sigciu-1oxmt5_5_tSQCyg5nc5_Z8FC6wtElokqBa6u9yKvHEWk94qYfF-IQs/s1600/AMUOLIVE.PNG" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="520" data-original-width="735" height="282" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjtmcTsTyeM8nP2dhxp3QL3IPKtbdZf91-lAhsOml3MZ6Cw3wxDBbH9UentYMpTtzEz5mrAvTZ54KjxlJ9sigciu-1oxmt5_5_tSQCyg5nc5_Z8FC6wtElokqBa6u9yKvHEWk94qYfF-IQs/s400/AMUOLIVE.PNG" width="400" /></a></div>
L'université de Marseille qui se réjouit de produire ... de l'huile d'olive.<br />
1) Marseille, et l'huile d'olive... On est limite dans la caricature<br />
2) Cherchez quelqu'un de jeune et dynamique sur la photographie.<br />
3) Juste pour le naturel de la pose de monsieur le président et monsieur le barbu...<br />
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#badcom<br />
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<br />Sulieshttp://www.blogger.com/profile/09149402437899363364noreply@blogger.com0tag:blogger.com,1999:blog-3446378579749835095.post-26244090767355459232017-12-31T12:53:00.001+01:002017-12-31T12:57:16.439+01:00De la musique, Egoïsme, narcissisme et névrose chez le musicien.<i>par Ambroise Sulies,</i><br />
<i>Institut d'aliénation narcissique de l'armée rouge</i><br />
<i>1er Maître de conférence</i><br />
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Je croisais récemment l'individu que j'avais pu interviewer dans le cadre d'une de mes études précédentes: le joueur de basson désabusé. Profitant de sa propension naturelle à parler de sa personne, je le persuadais aisément que son discours m'intéressait. Je le gardais sous la main un bon moment en lui offrant verre sur verre.<br />
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Il mena spontanément la conversation sur l'égo des musiciens. Car "n'en faut-il pas une bonne dose pour se dire qu'on va monter sur une scène pour jouer devant des gens, et penser qu'on va les intéresser", me dit-il. Il rajouta que plus on monte dans la hiérarchie des musiciens au sein de leur dictature méritocratique, plus les individus ont des égos sur-dimensionnés. Je souris en remarquant que des descriptions tout à fait similaires s'appliquaient aux membres de mon institut de recherche.<br />
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Mon ami m'affirma ensuite que les plus névrosés des musiciens se trouvaient aux postes les plus prestigieux. "<i>Oh combien de premier violons, combien de chefs d'orchestre, qui se prétendaient joyeux dans leur solfège lointain</i>"[1]. Le pompon se trouveraient chez les pianistes virtuoses. Il m'expliqua que pour être une de ces stars du clavier, il faut obtenir le premier prix de son conservatoire à dix ans, et donc avoir commencé à pratiquer l'instrument aux nombreuses touches dans sa petite enfance. Les pianistes solistes qu'on applaudit dans les salles de concert n'ont jamais choisi cette carrière. Ils y ont été poussé par des parents qui leur ont "donné" le "goût" de la musique, et ils se sont retrouvé pianistes révérés avant d'avoir eu l'occasion et la maturité d'y réfléchir. Ce sont donc tous de grands névrosés.<br />
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Après avoir descendu cul-sec une pinte de Picon, mon musicien amer me cita l'exemple de François-René Duchâble[2], illustrant parfaitement ces problèmes mentaux qui touchent les grands pianistes. Atteignant la cinquantaine, le musicien se rendit compte au milieu d'un concerto qu'il n'avait jamais choisi son métier, qu'il détestait son aspect formel et hiérarchique. Il interrompit immédiatement sa carrière, jetant un peu plus tard ses pianos dans des lacs et brûlant ses costume queue de pie. Cette réalisation tardive semble avoir été cathartique dans ce cas. Mais, peut-on y trouver une autre explications ?<br />
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Une angoisse récurrente de mon bassoniste était la peur de vieillir. Il essayait d'imaginer l'anxiété du premier violon qui ne trouve plus dans ses doigts la force de pincer les cordes et dans ses muscles celle de maintenir l'instrument. A son déclin, le premier violon peut-il mettre son égo de coté et redescendre dans la hiérarchie ? Le pianiste vieillissant aurait-il pu sentir son talent le fuir, et prétendre une épiphanie pour ne pas avoir à faire face à sa propre déchéance ? Lui-seul le sait, j'imagine.<br />
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Le joueur de basson effondré sur la table du bar ne m'en dit pas beaucoup plus ce soir là, mis à part dans un dernier souffle aviné "Heur'sement pour moi, chai jamais été un grand virtuose, moa!" avant de roter en "La".<br />
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<span style="font-size: xx-small;"><span style="font-family: "courier new" , "courier" , monospace;">Notes:</span></span><br />
<span style="font-size: xx-small;"><span style="font-family: "courier new" , "courier" , monospace;">[1] Citation attribuée à Hugues Victer</span></span><br />
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<span style="font-size: xx-small;"><span style="font-family: "courier new" , "courier" , monospace;"><span style="font-size: xx-small;">[2] https://fr.wikipedia.org/wiki/Fran%C3%A7ois-Ren%C3%A9_Duch%C3%A2ble</span></span></span><br />
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<span style="font-size: x-small;"><span style="font-family: "courier new" , "courier" , monospace;"><span style="font-size: x-small;"><span style="font-family: "arial" , "helvetica" , sans-serif;">D'autres articles dans cette série:</span></span></span><span style="font-family: "arial" , "helvetica" , sans-serif;">
<span style="font-size: x-small;"><a href="http://sulies.blogspot.fr/2015/01/de-la-musique-pre-face-b.html">http://sulies.blogspot.fr/2015/01/de-la-musique-pre-face-b.html</a></span></span></span>
Sulieshttp://www.blogger.com/profile/09149402437899363364noreply@blogger.com0tag:blogger.com,1999:blog-3446378579749835095.post-43781878941570831152017-12-25T10:35:00.001+01:002017-12-25T10:35:52.903+01:00Méchoui de Noël<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhT6DfDD2yGT1HAtoDui9kbh2DGMBVdVud2fATQi-6lWPX_kPEHmIQKPJH6Lb65iJChBSBk0QZBCXc1Fb5b-rjT7jN00o3Q5zBBbudTvnLTzF7yH8r1dNorjgTUCNo6L-xWvuw1qgN2Vr9P/s1600/michoui.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="703" data-original-width="872" height="257" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhT6DfDD2yGT1HAtoDui9kbh2DGMBVdVud2fATQi-6lWPX_kPEHmIQKPJH6Lb65iJChBSBk0QZBCXc1Fb5b-rjT7jN00o3Q5zBBbudTvnLTzF7yH8r1dNorjgTUCNo6L-xWvuw1qgN2Vr9P/s320/michoui.png" width="320" /></a></div>
<br />Sulieshttp://www.blogger.com/profile/09149402437899363364noreply@blogger.com0tag:blogger.com,1999:blog-3446378579749835095.post-54661741549332810822017-10-30T21:30:00.002+01:002017-10-30T21:30:28.674+01:00CO-INDEPENDENT, UNIVERSALLY CONVEX SYSTEMS AND THE DERIVATION OF INTEGRAL LINES<br />
par A. SULIES, Y. SHASTRI, E. KOBAYASHI AND S. ZHENG<br />
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<u>Résumé:</u><br />
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<i>Let us suppose |D|=t. Recently, there has been much interest in the extension of nonnegative definite groups. We show that there exists a sub-isometric, linearly partial, closed and conditionallyWiles Clairaut prime. K. Robinson’s computation of irreducible points was a milestone in introductory discrete number theory. T. Maruyama’s computation of pseudo-stable, algebraically non-Germain lines was a milestone in potential theory.</i><br />
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<u>Télécharger l'article complet:</u><br />
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<a href="http://thatsmathematics.com/mathgen/paper.php?nameType%5B1%5D=custom&customName%5B1%5D=A.+Sulies&nameType%5B2%5D=generic&nameType%5B3%5D=generic&nameType%5B4%5D=generic&seed=445420884&format=pdf">http://thatsmathematics.com/mathgen/paper.php?nameType%5B1%5D=custom&customName%5B1%5D=A.+Sulies&nameType%5B2%5D=generic&nameType%5B3%5D=generic&nameType%5B4%5D=generic&seed=445420884&format=pdf</a><br />
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<u>Remarque:</u><br />
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Bien évidemment, le seul intérêt de la chose est qu'il a été écrit par un algorithme, comme expliqué sur cette page: <a href="http://thatsmathematics.com/blog/mathgen">http://thatsmathematics.com/blog/mathgen</a><br />
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<br />Sulieshttp://www.blogger.com/profile/09149402437899363364noreply@blogger.com0tag:blogger.com,1999:blog-3446378579749835095.post-17008610406894672652017-05-09T22:43:00.000+01:002017-05-09T22:44:58.130+01:00Ha ben m..., alors !<br />
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<i>Quand je réalise sur le quai d'une gare à Genève qu'en suisse, on recycle même les ...</i><br />
<br />Sulieshttp://www.blogger.com/profile/09149402437899363364noreply@blogger.com0