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Grigori Yakovlevich Perelman “No Estoy Interesado En El Dinero O La Fama; No Quiero Estar Expuesto Como Un Animal En El Zoo

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Grigori Yakovlevich Perelman “No Estoy Interesado En El Dinero O La Fama; No Quiero Estar Expuesto Como Un Animal En El Zoo Grigori Yakovlevich Perelman \No estoy interesado en el dinero o la fama; no quiero estar expuesto como un animal en el zoo. [...] no quiero que todo el mundo est´emir´andome." - Grigori Y. Perelman Asteroide El asteroide 50033-Perelman del cintur´onde asteroides del Sistema Solar, que fue descubierto el 3 de enero del 2000 por el astr´onomoaficionado Stefano Sposetti, lleva su nombre en su honor. Solo los/as matem´aticos/asm´asfamosos/as tienen un asteroide con su nombre; en contra de toda l´ogica,no hay ninguno con el nombre de Cauchy. Berkeley Perelman estuvo en la universidad p´ublicade California en Berkeley dos a~nos,entre 1993 y 1995, gracias a la prestigiosa beca Miller de investigaci´on.En ese periodo dio una demostraci´on concisa para la `conjetura del alma' de la geometr´ıade Riemann. Conjetura de Poincar´e Hernri Poincar´econjetur´oen 1904 el problema topol´ogicoque casi 100 a~nosm´astarde, en 2002, Perelman termin´odemostrando. Tras esto la conjetura adquiri´oel estatus de teorema. Diferente La comunidad matem´aticaen general, y m´asconcr´etamente la occidental, ha considerado su comportamiento como diferente por su decisi´onde anteponer las matem´aticasa la fama. El documental ruso El hombre que camina diferente: La lecci´onde Perelman, publicado en 2011, estudia la figura del matem´atico. Esfera La esfera en tres dimensiones es un objeto importante en los resultados sobre topolog´ıade Henri Poincar´e.Su extension a las cuatro dimensiones, la hiperesfera, es el objeto geom´etrico protagonista del teorema de Poincar´e. Flujo de Ricci Es un tipo de flujo geom´etrico,denominado as´ı en honor a Gregorio Ricci-Curbastro. Es imprescindible en la demostraci´onde la conjetura de Poincar´edada por Perelman. Genio En los a~nos80 Perelman consigui´ola mayor puntuaci´onde la asociaci´onMENSA. En la actualidad, con un cociente intelectual de 238 puntos, es considerado una de las personas m´as inteligentes del mundo. Humilde Perelman siempre ha mantenido una actitud humilde respecto a sus logros. Defiende que es injusto no reconocer a Richard Hamilton tanto m´eritocomo a ´elen la demostraci´onde la conjetura de Poincar´e. Inconformista La cr´ıticade Perelman a la mayor´ıade matem´aticos/asde la comunidad internacional es que son conformistas. Ya que, a pesar de ser honestos/as, son tolerantes con quienes no lo son. Jaula Perelman vive como en una jaula, incomunicado de la comunidad matem´atematicaen general. En parte por desici´onpersonal, y por otra debido al aislamiento sufrido por su sentido de la ´etica,seg´unel mismo dice. Kleiner-Lott Bruce Kleiner y John Lott formaron uno de los equipos encargados de verificar la desmostraci´on de la conjetura de Poincar´eofrecida por Perelman. P´ublicaronsus notas sobre los papeles de Perelman el 25 de mayo del 2006. Leningrado Conocida como Petrogrado hasta la muerte de Lenin, y actualmente llamada San Petersbur- go, es la ciudad en la que Perelman naci´o,se cri´o,estudi´oy desarroll´olas matem´aticasy los conocimientos suficientes para alcanzar los logros que lo han hecho famoso. Medalla Fields Galard´onotorgado por la Uni´onMatem´aticaInternacional por descubrimientos sobresalientes en matem´aticas.Es la mayor distinci´onentre la comunidad matem´aticainternacional, y es con- siderada el Nobel de matem´aticas.Perelman ha sido la ´unicapersona en la historia en rechazar este premio. Nudos En topolog´ıaun nudo es una curva cerrada que se cruza consigo misma, entrelaz´andose.El teorema de Poincar´eestablece una relaci´onentre los complementos de algunos nudos, la cual establece una relaci´onentre esos nudos. Olimpiada Internacional de Matem´atica Competici´oninternacional de matem´aticaspara alumnos de bachiller. Grigori Perelman par- ticip´oa los 16 a~noscon el equipo sovi´etico,que qued´osegundo, detr´asde la Rep´ublicaFederal Alemana y por delante de la Rep´ublicaDemocr´aticaAlemana. Perelman comparti´oel primer puesto y la medalla de oro, con una puntuaci´onperfecta, junto a un estudiante alem´any otro vietnamita. Problemas del milenio Lista de los 7 problemas matem´aticosm´asimportantes, sin resolver, propuesta por el Instituto Clay de Matem´aticasen el a~no2000. La conjetura de Poincar´ees el ´unicoproblema resuelto, el cual figuraba en la lista junto a la Hip´otesisde Riemann, el problema sobre la inclusi´onentre las clases de complejidad P y NP, y otros. La resoluci´onde cada problema se premia con un mill´on de d´olaresestadounidenses. Perelman rechaz´oel premio. Quasar Cuerpo celeste cuya imagen guarda cierta similitud con la proyecci´onestereogr´aficade los paralelos y los meridianos de una hiperesfera. Una de las dificultades de la conjetura de Poin- car´eera trabajar con la esfera de cuatro dimensiones espaciales. Y una forma que tenemos de entender la hiperesfera es mediante su proyecci´onen las tres dimensiones, usando la proyecci´on estereogr´afica. Richard Hamilton Matem´aticoy doctor en filosof´ıaestadounidense conocido por descubrir el flujo de Ricci. Inici´o un programa de investigaci´onque Grigori Perelman culmin´ocon la demostraci´onde la conjetura de Poincar´e.Recibi´oel premio Oswald Veblen por sus importantes aportaciones a la geometr´ıa y la topolog´ıa. S1 La circunferencia. Henri Poincar´eestableci´ola relaci´ontopol´ogicaentre la esfera y el resto de superficies cerradas en las que cualquier circunferencia situada en dicha superficie puede contraerse, sin romperse, hasta reducirse a un solo punto, sin salirse de la superficie. El ´exitode Perelman radica en demostrar una relaci´onan´alogapara la hiperesfera y otros objetos geom´etricos en la cuarta dimensi´on. Tian-Morgan Los matem´aticosGang Tian y John Morgan formar´onun equipo para verificar la validez de la famosa demostraci´onde Perelman. En la sesi´onplenaria del 24 de agosto del 2006 del Congreso Internacional de Matem´aticosMorgan declar´o:\En 2003 Perelman demostr´ola conjetura de Poincar´e". Uni´onde Rep´ublicasSocialistas Sovi´eticas El gran compromiso del pueblo sovi´eticocon la educaci´on,las ciencias y las nuevas formas de conocimiento dio lugar a programas muy avanzados para la formaci´onde matem´aticos/as. Gracias a esto Perelman pudo desarrollar todo su potencial en esta ciencia. Violinista Grigori Perelman demostr´odesde peque~nouna sensibilidad especial para la m´usica.Tocaba el viol´ıncon virtuosismo, y era aficionado a la opera italiana. Yehudim Perelman naci´oen el seno de una familia perteneciente al pueblo jud´ıo.Su padre, Yakov, que era ingeniero el´ectrico,le ense~noa jugar al ajedrez y fue quien le facilit´ocantidad de problemas matem´aticosy l´ogicos.Su madre, Lyubov, era maestra de matem´aticasy fue quien se preocup´o de dirigir el talento de Grigori hacia la formaci´onen un club de matem´aticas. Zhu-Cao Los matem´aticoschinos Zhu Xiping y Huai-Dong Cao formaron el tercero de los equipos para verificar la demostraci´onde la conjetura de Poincar´e.Tuvieron que rectificar los resultados que publicaron en junio del 2006 al respecto porque en ellos daban a entender que dichos resultados eran una demostraci´onpropia de la conjetura bas´andoseen los estudios de Hamilton y Perelman..
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