This thesis takes its motivation from the theory of isomorphic classification of Cartesian products of locally convex spaces which was introduced by V. P. Zahariuta in 1973. In the case $X_1 times X_2 cong Y_1 times Y_2$ for locally convex spaces $X_i$ and $Y_i,i=1,2$; it is proved that if $X_1,Y_2$ and $Y_1,X_2$ are in compact relation in operator sense, it is possible to say that the respective factors of the Cartesian products are also isomorphic, up to their some finite dimensional subspaces. Zahariuta s theory has been comprehensively studied for special classes of locally convex spaces, especially for finite and infinite type power series spaces under a weaker operator relation, namely strictly singular. In this work we give several s...
We prove two abstract theorems which allow to transfer stability results of topological properties f...
International audienceWe completely determine the ℓq and C(K) spaces which are isomorphic to a subsp...
AbstractLet E be a locally convex space. Then E is nuclear metrizable if and only if there exists a ...
V. P. Zahariuta, in 1973, used the theory of Fredholm operators to develop a method to classify Cart...
In 1973, V. P. Zahariuta formed a method to classify the Cartesian products of locally convex spaces...
Let $(X_i,Y_i), i=1,2$ be pairs of locally convex spaces satisfying $X_1 \times X_2 \cong Y_1 \times...
A new class of linear and bounded operators is introduced. This class is more general than the class...
A local convex space E is said to be distinguished if its strong dual Eβ′ has the topology β(E′,(Eβ′...
For locally convex spaces E and F, the continuous linear map T : E -> F is called bounded if there i...
We consider a possible isomorphism of cartesian product of two Dragilev spaces of infinite type, and...
Topological algebra and general topology are considered in the paper aiming at the property investig...
Parallel to the study of finite-dimensional Banach spaces, there is a growing interest in the corres...
We describe complemented copies of 2 both in C(K1)⊗̂πC(K2) when at least one of the compact spaces K...
summary:Using factorization properties of an operator ideal over a Banach space, it is shown how to ...
An explicit representation of the n-fold symmetric tensor product (equipped with a natural topology ...
We prove two abstract theorems which allow to transfer stability results of topological properties f...
International audienceWe completely determine the ℓq and C(K) spaces which are isomorphic to a subsp...
AbstractLet E be a locally convex space. Then E is nuclear metrizable if and only if there exists a ...
V. P. Zahariuta, in 1973, used the theory of Fredholm operators to develop a method to classify Cart...
In 1973, V. P. Zahariuta formed a method to classify the Cartesian products of locally convex spaces...
Let $(X_i,Y_i), i=1,2$ be pairs of locally convex spaces satisfying $X_1 \times X_2 \cong Y_1 \times...
A new class of linear and bounded operators is introduced. This class is more general than the class...
A local convex space E is said to be distinguished if its strong dual Eβ′ has the topology β(E′,(Eβ′...
For locally convex spaces E and F, the continuous linear map T : E -> F is called bounded if there i...
We consider a possible isomorphism of cartesian product of two Dragilev spaces of infinite type, and...
Topological algebra and general topology are considered in the paper aiming at the property investig...
Parallel to the study of finite-dimensional Banach spaces, there is a growing interest in the corres...
We describe complemented copies of 2 both in C(K1)⊗̂πC(K2) when at least one of the compact spaces K...
summary:Using factorization properties of an operator ideal over a Banach space, it is shown how to ...
An explicit representation of the n-fold symmetric tensor product (equipped with a natural topology ...
We prove two abstract theorems which allow to transfer stability results of topological properties f...
International audienceWe completely determine the ℓq and C(K) spaces which are isomorphic to a subsp...
AbstractLet E be a locally convex space. Then E is nuclear metrizable if and only if there exists a ...