Sur les rapports de convexité des topologies et bornologies dans les espaces nucléaires
Sur un théorème du type Banach-Steinhaus pour les convexes topologiques
Sur une conjecture de Fakhoury
Sur Une Propriété De Permanence De Certaines Classes D'Espaces Localment Convexes
Sur une propriété de permanence de certaines classes d'espaces localement convexes.
Symboles et noyaux des opérateurs différentiels
Systèmes projectifs d'ensembles convexes compacts
Tensorprodukte von stetigen linearen Abbildungen in (F)- und (DCF)-Räumen.
The boundedness principle for lattice-normed spaces.
The equicontinuous week* topology and semi-reflexivity
The Facial Q-Topology for Compact Convex Sets.
The locally convex -spaces and their dual spaces.
The Poulsen simplex
It is proved that there is a unique metrizable simplex whose extreme points are dense. This simplex is homogeneous in the sense that for every 2 affinely homeomorphic faces and there is an automorphism of which maps onto . Every metrizable simplex is affinely homeomorphic to a face of . The set of extreme points of is homeomorphic to the Hilbert space . The matrices which represent are characterized.
The semigroup of Fredholm operators.
The space of maximal convex sets
The sums of closed subspaces in a topological linear space
The symmetric tensor product of a direct sum of locally convex spaces
An explicit representation of the n-fold symmetric tensor product (equipped with a natural topology τ such as the projective, injective or inductive one) of the finite direct sum of locally convex spaces is presented. The formula for gives a direct proof of a recent result of Díaz and Dineen (and generalizes it to other topologies τ) that the n-fold projective symmetric and the n-fold projective “full” tensor product of a locally convex space E are isomorphic if E is isomorphic to its square .
The theory of bounding subsets of topological vector spaces without convexity condition
Théorèmes d'identité en dimension infinie
Three-space-problem for some classes of linear topological spaces
We examine the so-called three-space-stability for some classes of linear topological and locally convex spaces for which this problem has not been investigated.