[][com.sigma.fs3.argos.domain.gpc.GpcArticlesRev[id=com.sigma.fs3.argos.domain.gpc.GpcArticlesRevPK[ifcactivitat=ARE, ifccomptador=53329]], camposKey:0166-8641 2010-02-15 Primitive elements in rings of continuous functions522529, com.sigma.fs3.argos.domain.gpc.GpcArticlesRev[id=com.sigma.fs3.argos.domain.gpc.GpcArticlesRevPK[ifcactivitat=ARE, ifccomptador=53330]], camposKey:0166-8641 2009-12-01 Integral extensions on rings of continuous functions29963001, com.sigma.fs3.argos.domain.gpc.GpcArticlesRev[id=com.sigma.fs3.argos.domain.gpc.GpcArticlesRevPK[ifcactivitat=ARE, ifccomptador=53331]], camposKey:0166-8641 2004-02-28 Finite homomorphisms on rings of continuous functions115124, com.sigma.fs3.argos.domain.gpc.GpcArticlesRev[id=com.sigma.fs3.argos.domain.gpc.GpcArticlesRevPK[ifcactivitat=ARE, ifccomptador=53332]], camposKey:0016-2736 2003-01-01 A generating family for the Freudenthal compactification of a class of rimcompact spaces203215, com.sigma.fs3.argos.domain.gpc.GpcArticlesRev[id=com.sigma.fs3.argos.domain.gpc.GpcArticlesRevPK[ifcactivitat=ARE, ifccomptador=53333]], camposKey:0236-5294 2002-04-01 Algebras between C*(X) and C(X) that are closed under countable composition2935, com.sigma.fs3.argos.domain.gpc.GpcArticlesRev[id=com.sigma.fs3.argos.domain.gpc.GpcArticlesRevPK[ifcactivitat=ARE, ifccomptador=53334]], camposKey:0236-5294 2002-03-01 There do not exist minimal algebras between C*(X) and C(X) with prescribed real maximal ideal spaces351355, com.sigma.fs3.argos.domain.gpc.GpcArticlesRev[id=com.sigma.fs3.argos.domain.gpc.GpcArticlesRevPK[ifcactivitat=ARE, ifccomptador=53340]], camposKey:0146-4124 1999-01-01 Countably generated intermediate algebras between C * (X) and C(X)129139, com.sigma.fs3.argos.domain.gpc.GpcArticlesRev[id=com.sigma.fs3.argos.domain.gpc.GpcArticlesRevPK[ifcactivitat=ARE, ifccomptador=53339]], camposKey:0016-660X 1999-01-01 Intersections of maximal ideals in algebras between C*(X) and C(X)149165, com.sigma.fs3.argos.domain.gpc.GpcArticlesRev[id=com.sigma.fs3.argos.domain.gpc.GpcArticlesRevPK[ifcactivitat=ARE, ifccomptador=53335]], camposKey:0016-660X 1997-12-01 Intermediate algebras between C*(X) and C(X) as rings of fractions of C*(X)115130, com.sigma.fs3.argos.domain.gpc.GpcArticlesRev[id=com.sigma.fs3.argos.domain.gpc.GpcArticlesRevPK[ifcactivitat=ARE, ifccomptador=53336]], camposKey:0002-9939 1986-01-01 Nonarchimedean c*(x)525530, com.sigma.fs3.argos.domain.gpc.GpcArticlesRev[id=com.sigma.fs3.argos.domain.gpc.GpcArticlesRevPK[ifcactivitat=ARE, ifccomptador=53337]], camposKey:0002-9939 1984-01-01 The gelfand subalgebra of real or nonarchimedean valued continuous functions145148, com.sigma.fs3.argos.domain.gpc.GpcArticlesRev[id=com.sigma.fs3.argos.domain.gpc.GpcArticlesRevPK[ifcactivitat=ARE, ifccomptador=53338]], camposKey:0030-8730 1983-01-01 Non-archimedean gelfand theory337341, com.sigma.fs3.argos.domain.gpc.GpcArticlesRev[id=com.sigma.fs3.argos.domain.gpc.GpcArticlesRevPK[ifcactivitat=ARE, ifccomptador=25739]], camposKey:0373-0999 1982-01-01 Sobre la subálgebra de Gelfand del anillo de funciones continuas con valores en un cuerpo valuado no-arquimediano.133138, com.sigma.fs3.argos.domain.gpc.GpcArticlesRev[id=com.sigma.fs3.argos.domain.gpc.GpcArticlesRevPK[ifcactivitat=ARE, ifccomptador=25740]], camposKey:0373-0999 1981-01-01 Una nota sobre las álgebras de Banach regulares no-arquimedianas.139144][][][][][][][][][][][][com.sigma.fs3.argos.domain.gpc.GpcTesis[id=com.sigma.fs3.argos.domain.gpc.GpcTesisPK[ifcactivitat=TES, ifccomptador=2145627496]]][][][][][][][][][][com.sigma.fs3.argos.domain.gpc.ayudasrecerca.ConvenisPPC@373e3c][][][][][][][][com.sigma.investigacion.cawdos.entities.ayudaInvestigacion.ProjectesPPC[id=com.sigma.fs3.argos.domain.gpc.ayudasrecerca.ProjectesPPCId@414e5d], com.sigma.investigacion.cawdos.entities.ayudaInvestigacion.ProjectesPPC[id=com.sigma.fs3.argos.domain.gpc.ayudasrecerca.ProjectesPPCId@413e26], com.sigma.investigacion.cawdos.entities.ayudaInvestigacion.ProjectesPPC[id=com.sigma.fs3.argos.domain.gpc.ayudasrecerca.ProjectesPPCId@413f62], com.sigma.investigacion.cawdos.entities.ayudaInvestigacion.ProjectesPPC[id=com.sigma.fs3.argos.domain.gpc.ayudasrecerca.ProjectesPPCId@413f99], com.sigma.investigacion.cawdos.entities.ayudaInvestigacion.ProjectesPPC[id=com.sigma.fs3.argos.domain.gpc.ayudasrecerca.ProjectesPPCId@411d81], com.sigma.investigacion.cawdos.entities.ayudaInvestigacion.ProjectesPPC[id=com.sigma.fs3.argos.domain.gpc.ayudasrecerca.ProjectesPPCId@412223], com.sigma.investigacion.cawdos.entities.ayudaInvestigacion.ProjectesPPC[id=com.sigma.fs3.argos.domain.gpc.ayudasrecerca.ProjectesPPCId@413acb], com.sigma.investigacion.cawdos.entities.ayudaInvestigacion.ProjectesPPC[id=com.sigma.fs3.argos.domain.gpc.ayudasrecerca.ProjectesPPCId@413b00], com.sigma.investigacion.cawdos.entities.ayudaInvestigacion.ProjectesPPC[id=com.sigma.fs3.argos.domain.gpc.ayudasrecerca.ProjectesPPCId@413ad6]][][][][][][com.sigma.fs3.argos.domain.gpc.altres.ProjecteInnovacio@15e66, com.sigma.fs3.argos.domain.gpc.altres.ProjecteInnovacio@15b95, com.sigma.fs3.argos.domain.gpc.altres.ProjecteInnovacio@156d0, com.sigma.fs3.argos.domain.gpc.altres.ProjecteInnovacio@15443, com.sigma.fs3.argos.domain.gpc.altres.ProjecteInnovacio@151b3, com.sigma.fs3.argos.domain.gpc.altres.ProjecteInnovacio@14fb0, com.sigma.fs3.argos.domain.gpc.altres.ProjecteInnovacio@14b88, com.sigma.fs3.argos.domain.gpc.altres.ProjecteInnovacio@14dd3, com.sigma.fs3.argos.domain.gpc.altres.ProjecteInnovacio@13c0f, com.sigma.fs3.argos.domain.gpc.altres.ProjecteInnovacio@13c06, com.sigma.fs3.argos.domain.gpc.altres.ProjecteInnovacio@13bff, com.sigma.fs3.argos.domain.gpc.altres.ProjecteInnovacio@1404a, com.sigma.fs3.argos.domain.gpc.altres.ProjecteInnovacio@14055, com.sigma.fs3.argos.domain.gpc.altres.ProjecteInnovacio@14134, com.sigma.fs3.argos.domain.gpc.altres.ProjecteInnovacio@1412f][]