Artículo
Duality of measures of non-A-compactness
Autor/es | Delgado Sánchez, Juan Manuel
Piñeiro Gómez, Cándido |
Departamento | Departamento de Matemática Aplicada I |
Fecha de publicación | 2015 |
Fecha de depósito | 2020-05-08 |
Resumen | Let A be a Banach operator ideal. Based on the notion of A-compactness in a Banach space due to Carl and Stephani, we deal with the notion of measure of non-A-compactness of an operator. We consider a map χA (respectively, ... Let A be a Banach operator ideal. Based on the notion of A-compactness in a Banach space due to Carl and Stephani, we deal with the notion of measure of non-A-compactness of an operator. We consider a map χA (respectively, nA) acting on the operators of the surjective (respectively, injective) hull of A such that χA(T) = 0 (respectively, nA(T) = 0) if and only if the operator T is A-compact (respectively, injectively A-compact). Under certain conditions on the ideal A, we prove an equivalence inequality involving χA(T∗) and nAd(T). This inequality provides an extension of a previous result stating that an operator is quasi p-nuclear if and only if its adjoint is p-compact in the sense of Sinha and Karn. |
Cita | Juan Manuel Delgado Sánchez, y Cándido Piñeiro Gómez, (2015). Duality of measures of non-A-compactness. Studia Mathematica, 229 (2), 95-112. |
Ficheros | Tamaño | Formato | Ver | Descripción |
---|---|---|---|---|
sm7984-1-2016 (1).pdf | 343.1Kb | [PDF] | Ver/ | |