{"id":27644,"date":"2022-02-03T04:48:28","date_gmt":"2022-02-03T03:48:28","guid":{"rendered":"http:\/\/www.emiliosilveravazquez.com\/blog\/?p=27644"},"modified":"2022-02-03T04:48:28","modified_gmt":"2022-02-03T03:48:28","slug":"%c2%bfpodran-existir-las-estrellas-de-quarks","status":"publish","type":"post","link":"https:\/\/www.emiliosilveravazquez.com\/blog\/2022\/02\/03\/%c2%bfpodran-existir-las-estrellas-de-quarks\/","title":{"rendered":"\u00bfPodr\u00e1n existir las estrellas de Quarks?"},"content":{"rendered":"<p style=\"text-align: justify;\">\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0\u00a0<img decoding=\"async\" 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\" alt=\"C\u00f3mo distinguir estrellas de neutrones y estrellas de quarks con ondas  gravitatorias - La Ciencia de la Mula Francis\" \/><\/p>\n<p style=\"text-align: justify;\">\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00bfHechas de materia extra\u00f1a de Quarks-Gluones?<\/p>\n<blockquote>\n<p style=\"text-align: justify;\">El t\u00e9rmino\u00a0estrella de <a href=\"#\" onclick=\"referencia('quarks',event); return false;\">quarks<\/a>\u00a0es usado para denominar un hipot\u00e9tico tipo de estrella ex\u00f3tica en la cual, debido a la alta densidad, la materia existe en forma de Quarks y Gluones, es decir, eliminados los componentes de los <a href=\"#\" onclick=\"referencia('hadrones',event); return false;\">hadrones<\/a> por la densidad alcanzada debido a la fuerza de gravedad ejercida sobre la materia que, ni el Principio de exclusi\u00f3n de Pauli ha podido frenar.<\/p>\n<\/blockquote>\n<p style=\"text-align: justify;\">Hoy, con los conocimientos que atesoramos y los sofisticados instrumentos con los que contamos y, con los avances que hemos podido conseguir en F\u00edsica y Astrof\u00edsica, hemos llegado a un nivel muy aceptable del conocimiento de las estrellas y del proceso que siguen desde que &#8220;nacen&#8221; hasta que &#8220;mueren&#8221;, y, de entre toda la variedad de estos objetos estelares, los que m\u00e1s han llamado la atenci\u00f3n por sus especiales caracter\u00edsticas, han sido esas estrellas que, al final de sus vidas y dependiendo de sus masas, se pueden convertir en:<\/p>\n<blockquote>\n<p style=\"text-align: justify;\">\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0<img decoding=\"async\" src=\"https:\/\/encrypted-tbn0.gstatic.com\/images?q=tbn:ANd9GcTnNVqPznRv5A85AMOsXOGBJdPoqQDqmhlFEr2_-9KWsJlNqJQ4cukFxXM3rye0Ai7GKKo&amp;usqp=CAU\" alt=\"Sobre las estrellas - Estrellario\" \/><\/p>\n<\/blockquote>\n<p style=\"text-align: justify;\">\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0Este es el proceso conocido seg\u00fan la masa de la estrella<\/p>\n<ul style=\"text-align: justify;\">\n<li>Enanas Blancas,<\/li>\n<li>Estrellas de Neutrones, y<\/li>\n<li>Agujeros Negros.<\/li>\n<\/ul>\n<p style=\"text-align: justify;\">\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0\u00a0<img decoding=\"async\" src=\"https:\/\/e00-elmundo.uecdn.es\/assets\/multimedia\/imagenes\/2014\/06\/09\/14023103494389_464x0.gif\" alt=\"A la caza de las estrellas de quarks | Ciencia | EL MUNDO\" \/><\/p>\n<p style=\"text-align: justify;\">Sabemos que las estrellas como el Sol, agotado su combustible nuclear de fusi\u00f3n basado en el Hidr\u00f3geno y el Helio, se transforma en Gigante roja para fusionar Carbono, Oxigeno y otros elementos m\u00e1s complejos, y, al llegar al Hierro, la fusi\u00f3n no puede continuar. Entonces, la estrella que antes se defend\u00eda con la emisi\u00f3n de radiaci\u00f3n contra la Gravedad, queda a merced de \u00e9sta y, eyecta las capas exteriores al Espacio Interestelar para formar una Nebulosa planetaria.<\/p>\n<p style=\"text-align: justify;\">\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0<img decoding=\"async\" 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alt=\"Qu\u00e9 son las nebulosas planetarias? \u2013 Nuestroclima\" \/><\/p>\n<p style=\"text-align: justify;\">\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0Las Nebulosas planetarias adoptan diversas formas<\/p>\n<p style=\"text-align: justify;\">El resto de la masa queda a merced de la fuerza de Gravedad que la comprime m\u00e1s y m\u00e1s, hasta llegar a la degeneraci\u00f3n de los <a href=\"#\" onclick=\"referencia('electron',event); return false;\">electrones<\/a> (al ser <a href=\"#\" onclick=\"referencia('fermion',event); return false;\">fermiones<\/a> no pueden estar juntos debido al Principio de Exclusi\u00f3n de Pauli), que comienzan a moverse con velocidades relativistas y frena la gravedad, lo que entonces queda es una estrella <a href=\"#\" onclick=\"referencia('enana blanca',event); return false;\">enana blanca<\/a> que emite radiaci\u00f3n en el ultravioleta fuerte ionizando la materia de la Nebulosa planetaria.<\/p>\n<p style=\"text-align: justify;\">\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0\u00a0<img decoding=\"async\" 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\" alt=\"Las estrellas de neutrones y quarks explicadas para todos los p\u00fablicos: as\u00ed  se forman dos de los objetos m\u00e1s asombrosos del universo\" \/><\/p>\n<p style=\"text-align: justify;\">Claro que, si la masa de la estrella es de m\u00e1s de 2 o 3 masas solares (sin pasar de 8), la secuencia finaliza en una estrella de <a href=\"#\" onclick=\"referencia('neutron',event); return false;\">neutrones<\/a>. El proceso es igual que en la mec\u00e1nica de la transformaci\u00f3n en <a href=\"#\" onclick=\"referencia('enana blanca',event); return false;\">enana blanca<\/a>, lo que ocurre es que, al estar en actividad una fuerza de Gravedad mayor, ni la degeneraci\u00f3n de los <a href=\"#\" onclick=\"referencia('neutron',event); return false;\">neutrones<\/a> puede frenarla y sigue comprimiendo la masa, de tal manera que <a href=\"#\" onclick=\"referencia('electron',event); return false;\">electrones<\/a> y <a href=\"#\" onclick=\"referencia('proton',event); return false;\">protones<\/a> se fusionan y se convierten en <a href=\"#\" onclick=\"referencia('neutron',event); return false;\">neutrones<\/a>, de ah\u00ed que al final lo que queda es esa estrella de <a href=\"#\" onclick=\"referencia('neutron',event); return false;\">neutrones<\/a> mucho m\u00e1s densa que la <a href=\"#\" onclick=\"referencia('enana blanca',event); return false;\">enana blanca<\/a>.<\/p>\n<p style=\"text-align: justify;\">\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0\u00a0<img decoding=\"async\" src=\"https:\/\/planetario.malargue.gov.ar\/wp-content\/uploads\/2016\/11\/a1-1.jpg\" alt=\"ESTRELLAS EL CICLO DE LA VIDA | Complejo Planetario Malargue\" \/><\/p>\n<p style=\"text-align: justify;\">Llegados a ese punto, se especula con la posibilidad de que, en estrellas m\u00e1s masivas, se compriman tambi\u00e9n los <a href=\"#\" onclick=\"referencia('neutron',event); return false;\">neutrones<\/a> y la fuerza de Gravedad contin\u00fae ejerciendo su fuerza de aplastamiento de la materia hasta llegar a los Quarks y Gluones y crear esa materia extra\u00f1a de la que estar\u00eda compuesta la estrella de Quarks.<\/p>\n<p style=\"text-align: justify;\">\u00a0 \u00a0 \u00a0 \u00a0 \u00a0<img decoding=\"async\" src=\"https:\/\/encrypted-tbn0.gstatic.com\/images?q=tbn:ANd9GcQ5xYzFznyThSIHlYCitRYGT_F3YevGjAMQ-Q&amp;usqp=CAU\" alt=\"Los Agujeros Negros : Explicados de una manera simple\" \/><img decoding=\"async\" src=\"https:\/\/encrypted-tbn0.gstatic.com\/images?q=tbn:ANd9GcSxq3545HwnyQLPzhnOfWGPopRgEn6DYFaWkQ&amp;usqp=CAU\" alt=\"Im\u00e1genes de agujeros negros cinco veces m\u00e1s n\u00edtidas desde la \u00f3rbita\" \/><\/p>\n<p style=\"text-align: justify;\">Se ha podido comprobar, sin lugar a ninguna duda, la transformaci\u00f3n de estrellas s\u00faper-masivas en Agujeros Negros. La fuerza que genera tan ingente masa genera tal fuerza de Gravedad que nada la puede frenar y finaliza convirti\u00e9ndose en una Singularidad de la que nada escapa. All\u00ed las leyes de la Relatividad hacen mutis por el foro, el Tiempo se detiene y el Espacio se distorsiona.<\/p>\n<p style=\"text-align: justify;\">\u00a0 \u00a0 \u00a0\u00a0<img decoding=\"async\" src=\"data:image\/jpeg;base64,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\" alt=\"Las enanas blancas, posible origen de la vida en el universo\" \/><img decoding=\"async\" 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\" alt=\"Monta\u00f1as de fracciones de mil\u00edmetro en estrellas de neutrones\" \/><\/p>\n<p style=\"text-align: justify;\">As\u00ed que las enanas blancas son estrellas como el Sol que se transforman al final de sus vidas y quedan reducidas al tama\u00f1o de la Tierra aproximadamente pero con una densidad enorme. Radian durante decenas de a\u00f1os hasta que se enfr\u00edan y se convierten en un cad\u00e1ver estelar.<\/p>\n<p style=\"text-align: justify;\">\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0<img decoding=\"async\" src=\"data:image\/jpeg;base64,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\" alt=\"Qu\u00e9 es una estrella de neutrones?\" \/><\/p>\n<p style=\"text-align: justify;\">Las estrellas de <a href=\"#\" onclick=\"referencia('neutron',event); return false;\">neutrones<\/a> se quedan en unos 10 Km de di\u00e1metro, y, la densidad de un metro c\u00fabico de estrella de <a href=\"#\" onclick=\"referencia('neutron',event); return false;\">neutrones<\/a> tendr\u00eda un peso de cerca de un trill\u00f3n de kg. Un simple metro c\u00fabico de su material pesar\u00eda un mill\u00f3n de millones de millones de kg. Esto nos lleva a afirmar que una cucharada de estrella de <a href=\"#\" onclick=\"referencia('neutron',event); return false;\">neutrones<\/a> pesar\u00eda tanto como todos los veh\u00edculos autom\u00f3viles de la Tierra.<\/p>\n<p style=\"text-align: justify;\">Si eso es as\u00ed (que lo es)&#8230; \u00bfQu\u00e9 pesar\u00e1 una cucharadita del material de un Agujero negro?<\/p>\n<p style=\"text-align: justify;\"><img decoding=\"async\" src=\"data:image\/jpeg;base64,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\" alt=\"C\u00f3mo distinguir estrellas de neutrones y estrellas de quarks con ondas  gravitatorias - La Ciencia de la Mula Francis\" \/><img decoding=\"async\" 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\" alt=\"Francis en @TrendingCiencia: El plasma de quarks y gluones - La Ciencia de  la Mula Francis\" \/><\/p>\n<p style=\"text-align: justify;\">\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0Si finalmente se formara la &#8220;materia extra\u00f1a&#8221;, s\u00ed podr\u00edan existir estrellas de Neutrones<\/p>\n<p style=\"text-align: justify;\">De todas estas estrellas podemos (m\u00e1s o menos) explicar sus m\u00e1s destacadas caracter\u00edsticas y tambi\u00e9n el por qu\u00e9, a partir de una estrella, se convierten en esos extra\u00f1os objetos de tan altas densidades y, cada una de ellas (la estrella <a href=\"#\" onclick=\"referencia('enana blanca',event); return false;\">enana blanca<\/a>, la de <a href=\"#\" onclick=\"referencia('neutron',event); return false;\">neutrones<\/a> o el <a href=\"#\" onclick=\"referencia('agujero negro',event); return false;\">agujero negro<\/a>, tienen sus especiales peculiaridades) pero, siguiendo la secuencia de estos tres ejemplos, la pregunta que se plantea en este debate es:<\/p>\n<p style=\"text-align: justify;\">\u00bfPodr\u00e1n existir las Estrellas de Quarks?<\/p>\n<p style=\"text-align: justify;\"><em>emilio silvera<\/em><\/p>\n<div class='bookmark'>\r\n\t\t<table align='left' border='0' cellpadding='0' width='100%'>\r\n\t\t<tr><td><span class='pushbutton'><a href='http:\/\/delicious.com\/post?url=https%3A%2F%2Fwww.emiliosilveravazquez.com%2Fblog%2F2022%2F02%2F03%2F%25c2%25bfpodran-existir-las-estrellas-de-quarks%2F&amp;title=%C2%BFPodr%C3%A1n+existir+las+estrellas+de+Quarks%3F' title='Delicious' target='_blank' rel='nofollow'><img src='https:\/\/www.emiliosilveravazquez.com\/blog\/wp-content\/plugins\/knxdt-bookmarks-wordpress-plugin\/images\/delicious.png'  alt='' class='book_img' border='none' style='margin:1px; padding: 0;'  \/><\/a><\/span><span class='pushbutton'><a 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\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 [&hellip;]<\/p>\n","protected":false},"author":2,"featured_media":0,"comment_status":"open","ping_status":"open","sticky":false,"template":"","format":"standard","meta":{"_s2mail":"yes","footnotes":""},"categories":[1],"tags":[],"_links":{"self":[{"href":"https:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/posts\/27644"}],"collection":[{"href":"https:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/posts"}],"about":[{"href":"https:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/types\/post"}],"author":[{"embeddable":true,"href":"https:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/users\/2"}],"replies":[{"embeddable":true,"href":"https:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/comments?post=27644"}],"version-history":[{"count":0,"href":"https:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/posts\/27644\/revisions"}],"wp:attachment":[{"href":"https:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/media?parent=27644"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"https:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/categories?post=27644"},{"taxonomy":"post_tag","embeddable":true,"href":"https:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/tags?post=27644"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}