Primary objective of the thesis is proof of the statement that if for ∈ ℕ a ≥ 1 a bilipschitz mapping belongs to +1, loc ∩ ,∞ loc then also its inverse −1 belongs to +1, loc . We prove a similar statement also for spaces loc . For this purpose we construct a new ordering of -th partial derivatives to generalized Jacobian matrix. Thanks to this matrix we are able to differentiate matrices in an applicable way. Generalized Jacobian matrix is projected so that there still holds the Chain rule and, in some way, also rules for matrices product differentiation.
We investigate the rule for differentiating an inverse function then make some observations about re...
We present a new inverse mapping theorem for correspondences. It uses a notion of differentiability ...
The concept of singular, Semi-singular and non-singular bimatrices are introduced. The concept of in...
Primary objective of the thesis is proof of the statement that if for ∈ ℕ a ≥ 1 a bilipschitz mappin...
International audienceThe objective of this short note is to provide an estimate of the generalized ...
Let Ω ⊂ Rn be open and suppose that f : Ω → Rn is a bilipschitz mapping such that Df ∈ BVloc(Ω, Rn 2...
We establish the following converse of the well-known inverse function theorem. Let g:U→V and f:V→U ...
Let Ω ⊂ Rn be open and suppose that f: Ω → Rn is a bilipschitz mapping such that Df ∈ BVloc(Ω, R n 2...
initial introduction of the general reciprocal or generalized inverse of a linear operator was not i...
This book addresses selected topics in the theory of generalized inverses. Following a discussion of...
Abstract. The paper deals with two types of inverse spectral problems for the class of generalized J...
AbstractThe problem of developing conditions under which generalized inverses of a partitioned matri...
We have named generalized Jacobi matrices to those that are practically tridiagonal, except for the ...
In this paper, {1}-inverses of a nilpotent matrix as well as matrices above a given nilpotent matrix...
AbstractThe relationships between generalized inverses of the product of two matrices A, B and the p...
We investigate the rule for differentiating an inverse function then make some observations about re...
We present a new inverse mapping theorem for correspondences. It uses a notion of differentiability ...
The concept of singular, Semi-singular and non-singular bimatrices are introduced. The concept of in...
Primary objective of the thesis is proof of the statement that if for ∈ ℕ a ≥ 1 a bilipschitz mappin...
International audienceThe objective of this short note is to provide an estimate of the generalized ...
Let Ω ⊂ Rn be open and suppose that f : Ω → Rn is a bilipschitz mapping such that Df ∈ BVloc(Ω, Rn 2...
We establish the following converse of the well-known inverse function theorem. Let g:U→V and f:V→U ...
Let Ω ⊂ Rn be open and suppose that f: Ω → Rn is a bilipschitz mapping such that Df ∈ BVloc(Ω, R n 2...
initial introduction of the general reciprocal or generalized inverse of a linear operator was not i...
This book addresses selected topics in the theory of generalized inverses. Following a discussion of...
Abstract. The paper deals with two types of inverse spectral problems for the class of generalized J...
AbstractThe problem of developing conditions under which generalized inverses of a partitioned matri...
We have named generalized Jacobi matrices to those that are practically tridiagonal, except for the ...
In this paper, {1}-inverses of a nilpotent matrix as well as matrices above a given nilpotent matrix...
AbstractThe relationships between generalized inverses of the product of two matrices A, B and the p...
We investigate the rule for differentiating an inverse function then make some observations about re...
We present a new inverse mapping theorem for correspondences. It uses a notion of differentiability ...
The concept of singular, Semi-singular and non-singular bimatrices are introduced. The concept of in...