{"id":11382,"date":"2012-04-10T13:54:59","date_gmt":"2012-04-10T11:54:59","guid":{"rendered":"https:\/\/ocasapiens-dweb.blogautore.repubblica.it\/?p=11382"},"modified":"2021-09-19T14:54:04","modified_gmt":"2021-09-19T12:54:04","slug":"bayesiani-frequentisti-9-a-7","status":"publish","type":"post","link":"https:\/\/archivio.ocasapiens.org\/index.php\/2012\/04\/10\/bayesiani-frequentisti-9-a-7\/","title":{"rendered":"Bayesiani &#8211; frequentisti: 9 a 7"},"content":{"rendered":"<p><img decoding=\"async\" class=\"aligncenter\" src=\"http:\/\/t3.gstatic.com\/images?q=tbn:ANd9GcTRsQbu2DQrfszhbtS8J5POw9bryj9tVbaNCUJ3NBcDrd_e5gSrIQ\" alt=\"\" \/><\/p>\n<p>Com&#8217;\u00e8 noto, ci ho una teoria: nasciamo bayesiani e ci conviene. Oh. Dunque.<\/p>\n<p>Qualcuno ricorder\u00e0 &#8211; figurarsi &#8211; che nel 2010 i frequentisti dell&#8217;<a href=\"http:\/\/www.eso.org\/sci\/facilities\/lasilla\/instruments\/harps\/index.html\" target=\"_blank\" rel=\"noopener\">HARPS<\/a> &#8211; &#8220;<span style=\"font-family: Georgia, serif; line-height: 18px; text-align: left;\">High Accuracy Radial Velocity Planet <\/span><span style=\"font-family: Georgia, serif; line-height: 18px; text-align: left;\">Searcher&#8221;, <\/span>uno strumentone dell&#8217;ESO, in Cile &#8211; avevano trovato 5 pianeti pi\u00f9 2 sospetti tali attorno ad <a href=\"http:\/\/en.wikipedia.org\/wiki\/HD_10180\" target=\"_blank\" rel=\"noopener\">Accad\u00ec 10180<\/a>, un solicello di 4 miliardi e rotti anni (<a href=\"http:\/\/www.eso.org\/public\/videos\/eso1035d\/\" target=\"_blank\" rel=\"noopener\">video artistico del sistema<\/a>), nella costellazione dell&#8217;Idra. Che a rigore dovrebbe chiamarsi\u00a0<a href=\"http:\/\/it.wikipedia.org\/wiki\/Idra_Maschio_(costellazione)\">Idro<\/a>.<\/p>\n<p>Be&#8217;, <a href=\"http:\/\/arxiv.org\/pdf\/1204.1254v1.pdf\" target=\"_blank\" rel=\"noopener\">prossimamente<\/a> su\u00a0<em>Astronomy &amp; Astrophysics<\/em>, il bayesiano finlandese <a href=\"image\/jpeg;base64,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\n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\" target=\"_blank\" rel=\"noopener\">Mikko Tuomi<\/a> ne pubblicher\u00e0 7 pi\u00f9 2 con il 99,7% di probabilit\u00e0. Che se ci teniamo Plutone invece di metterlo fra i plutoidi, fa<\/p>\n<p style=\"text-align: center;\">Sol I &#8211; HD 10180: 9 a 9.<\/p>\n<p style=\"text-align: left;\">per adesso.<\/p>\n","protected":false},"excerpt":{"rendered":"<p>Com&#8217;\u00e8 noto, ci ho una teoria: nasciamo bayesiani e ci conviene. Oh. Dunque. Qualcuno ricorder\u00e0 &#8211; figurarsi &#8211; che nel 2010 i frequentisti dell&#8217;HARPS &#8211; &#8220;High Accuracy Radial Velocity Planet Searcher&#8221;, uno strumentone dell&#8217;ESO, in Cile &#8211; avevano trovato 5 pianeti pi\u00f9 2 sospetti tali attorno ad Accad\u00ec 10180, un solicello di 4 miliardi e&hellip; <a class=\"more-link\" href=\"https:\/\/archivio.ocasapiens.org\/index.php\/2012\/04\/10\/bayesiani-frequentisti-9-a-7\/\">Continua a leggere <span class=\"screen-reader-text\">Bayesiani &#8211; frequentisti: 9 a 7<\/span><\/a><\/p>\n","protected":false},"author":1,"featured_media":0,"comment_status":"open","ping_status":"open","sticky":false,"template":"","format":"standard","meta":{"footnotes":""},"categories":[5],"tags":[2401,3282],"class_list":["post-11382","post","type-post","status-publish","format-standard","hentry","category-astronomia","tag-esopianeti","tag-hd-10180","entry"],"_links":{"self":[{"href":"https:\/\/archivio.ocasapiens.org\/index.php\/wp-json\/wp\/v2\/posts\/11382","targetHints":{"allow":["GET"]}}],"collection":[{"href":"https:\/\/archivio.ocasapiens.org\/index.php\/wp-json\/wp\/v2\/posts"}],"about":[{"href":"https:\/\/archivio.ocasapiens.org\/index.php\/wp-json\/wp\/v2\/types\/post"}],"author":[{"embeddable":true,"href":"https:\/\/archivio.ocasapiens.org\/index.php\/wp-json\/wp\/v2\/users\/1"}],"replies":[{"embeddable":true,"href":"https:\/\/archivio.ocasapiens.org\/index.php\/wp-json\/wp\/v2\/comments?post=11382"}],"version-history":[{"count":2,"href":"https:\/\/archivio.ocasapiens.org\/index.php\/wp-json\/wp\/v2\/posts\/11382\/revisions"}],"predecessor-version":[{"id":40712,"href":"https:\/\/archivio.ocasapiens.org\/index.php\/wp-json\/wp\/v2\/posts\/11382\/revisions\/40712"}],"wp:attachment":[{"href":"https:\/\/archivio.ocasapiens.org\/index.php\/wp-json\/wp\/v2\/media?parent=11382"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"https:\/\/archivio.ocasapiens.org\/index.php\/wp-json\/wp\/v2\/categories?post=11382"},{"taxonomy":"post_tag","embeddable":true,"href":"https:\/\/archivio.ocasapiens.org\/index.php\/wp-json\/wp\/v2\/tags?post=11382"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}