A smooth non-linear map is studied in a neighbourhood of an abnormal (degenerate) point. Inverse function and implicit function theorems are proved. The proof is based on the examination of a family of constrained extremal problems; second-order necessary conditions, which make sense also in the abnormal case, are used in the process. If the point under consideration is normal, then these conditions turn into the classical ones. Bibliography: 15 titles
AbstractThe implicit-function theorem deals with the solutions of the equation F(x, t) = a for local...
ABSTRACT. We prove implicit and inverse function theorems for non-C1 functions, and characterize non...
The authors consider Banach spaces X and Y, a differentiable map Fcolon X to Y, and points x^* in X ...
A smooth non-linear map is studied in a neighbourhood of an abnormal (degenerate) point. Inverse fun...
We study the solubility of systems of non-linear equations in a neighbourhood of an abnormal point a...
The following two classical problems are considered: the existence and the estimate of a solution of...
A survey is given of results related to the inverse function theorem and to necessary and sufficient...
The article deals with the equation F(x,sigma) = 0 quad (x in U)tag1 where F: X times Sigma to Y is ...
We prove a non-smooth generalization of the global implicit function theorem. More precisely we use ...
We obtain a global inverse function theorem guaranteeing that if a smooth mapping of finite-dimensio...
The first part of this paper considers the problem of solving an equation of the form F(x,y) = 0, f...
AbstractWe extend the classical inverse and implicit function theorems, the implicit function theore...
I show that the general implicit-function problem (or parametrized fixed-point problem) in one compl...
We consider the equation F(x, σ) = 0, x ∈ K, in which σ is a parameter and x is an unknown variable ...
Optimality conditions for nonlinear problems with equality and inequality constraints are considered...
AbstractThe implicit-function theorem deals with the solutions of the equation F(x, t) = a for local...
ABSTRACT. We prove implicit and inverse function theorems for non-C1 functions, and characterize non...
The authors consider Banach spaces X and Y, a differentiable map Fcolon X to Y, and points x^* in X ...
A smooth non-linear map is studied in a neighbourhood of an abnormal (degenerate) point. Inverse fun...
We study the solubility of systems of non-linear equations in a neighbourhood of an abnormal point a...
The following two classical problems are considered: the existence and the estimate of a solution of...
A survey is given of results related to the inverse function theorem and to necessary and sufficient...
The article deals with the equation F(x,sigma) = 0 quad (x in U)tag1 where F: X times Sigma to Y is ...
We prove a non-smooth generalization of the global implicit function theorem. More precisely we use ...
We obtain a global inverse function theorem guaranteeing that if a smooth mapping of finite-dimensio...
The first part of this paper considers the problem of solving an equation of the form F(x,y) = 0, f...
AbstractWe extend the classical inverse and implicit function theorems, the implicit function theore...
I show that the general implicit-function problem (or parametrized fixed-point problem) in one compl...
We consider the equation F(x, σ) = 0, x ∈ K, in which σ is a parameter and x is an unknown variable ...
Optimality conditions for nonlinear problems with equality and inequality constraints are considered...
AbstractThe implicit-function theorem deals with the solutions of the equation F(x, t) = a for local...
ABSTRACT. We prove implicit and inverse function theorems for non-C1 functions, and characterize non...
The authors consider Banach spaces X and Y, a differentiable map Fcolon X to Y, and points x^* in X ...