-convexity and duality for almost summing operators.
diamètre de classes d’espaces de Sobolev sur associés à des opérateurs de type «Schrödinger»
-equivalence and continuous bundles of -algebras.
-theory as the -theory of -categories.
K problematice rozšiřování lineárních operací na modulech
-théorie algébrique négative et -théorie topologique de l’algèbre de Fréchet des opérateurs régularisants
-théorie bivariante de Kasparov
-theory and Toeplitz -algebras a survey
-theory for Cuntz-Krieger algebras arising from real quadratic maps.
K zobecnění pojmu projektor
Kadec norms and Borel sets in a Banach space
We introduce a property for a couple of topologies that allows us to give simple proofs of some classic results about Borel sets in Banach spaces by Edgar, Schachermayer and Talagrand as well as some new results. We characterize the existence of Kadec type renormings in the spirit of the new results for LUR spaces by Moltó, Orihuela and Troyanski.
Kadec Norms on Spaces of Continuous Functions
2000 Mathematics Subject Classification: Primary: 46B03, 46B26. Secondary: 46E15, 54C35.We study the existence of pointwise Kadec renormings for Banach spaces of the form C(K). We show in particular that such a renorming exists when K is any product of compact linearly ordered spaces, extending the result for a single factor due to Haydon, Jayne, Namioka and Rogers. We show that if C(K1) has a pointwise Kadec renorming and K2 belongs to the class of spaces obtained by closing the class of compact...
K-analytic locally convex spaces
Kantorovich spaces and optimization.
Kato's equality and spectral decomposititon for positive C0-Groups.
K-Convergence And The Orlicz-Pettis Theorem
K-convergence entails absolute K-convergence in quasi-normed groups
Kennzeichnende Eigenschaften bewerteter Vektorräume.
Kergin interpolation in Banach spaces
We study the Kergin operator on the space of nuclearly entire functions of bounded type on a Banach space E. We show that the Kergin operator is a projector with interpolating properties and that it preserves homogeneous solutions to homogeneous differential operators. Further, we show that the Kergin operator is uniquely determined by these properties. We give error estimates for approximating a function by its Kergin polynomial and show in this way that for any given bounded sequence of interpolation...
Kernel Operators on Lp-spaces Associated with Semifinite von Neumann Algebras.