Add to ORKGFinite-dimensional perturbing operators are constructed using some incomplete information about eigen-solutions of an original and/or adjoint generalized Fred-holm operator equation (with zero index). Adding such perturbing operator to the original one reduces the eigen-space dimension and can, particularly, lead to an unconditionally and uniquely solvable perturbed equation. For the second kind Fredholm operators, the perturbing operators are analysed such that the spectrum points for an original and the perturbed operator coincide except a spectrum point considered, which can be removed for the perturbed operator. A relation between resolvents of original and perturbed operators is obtained. Effective procedures are described for calculat...
AbstractThis paper is a discussion of the perturbation of operators in certain of their invariant su...
By means of a suitable degree theory, we prove persistence of eigenvalues and eigenvectors for set-v...
Asymptotic and numerical methods are used to study several classes of singularly perturbed boundary ...
Finite-dimensional perturbing operators are constructed using some incomplete information about eige...
The object of this study is the Friedrichs model in the case of one-dimensional perturbation of the ...
The object of this study is the Friedrichs model in the case of one-dimensional perturbation of the ...
In treating so-called "bounded quantum mechanical problems" one is generally led to difficult eigenv...
AbstractAn elliptic partial differential operator satisfies the Gårding inequality, which leads to a...
We examine the operator algebra A behind the boundary integral equation method for solving transmiss...
Beyn W-J, Latushkin Y, Rottmann-Matthes J. Finding Eigenvalues of Holomorphic Fredholm Operator Penc...
We present an algorithm which, based on certain properties of analytic dependence, constructs bounda...
We review some recent results concerning nonlinear eigenvalue problems of the form (*) Au + eB(u) =c...
AbstractWe study singularly perturbed Fredholm equations of the second kind. We give sufficient cond...
We consider a broad class of linear operator equations that includes systems of ordinary differentia...
AbstractThe perturbed eigenvalue problem L(x)v(x) = λ(x)v(x) is considered near 0 = x ∈ R with L(x) ...
AbstractThis paper is a discussion of the perturbation of operators in certain of their invariant su...
By means of a suitable degree theory, we prove persistence of eigenvalues and eigenvectors for set-v...
Asymptotic and numerical methods are used to study several classes of singularly perturbed boundary ...
Finite-dimensional perturbing operators are constructed using some incomplete information about eige...
The object of this study is the Friedrichs model in the case of one-dimensional perturbation of the ...
The object of this study is the Friedrichs model in the case of one-dimensional perturbation of the ...
In treating so-called "bounded quantum mechanical problems" one is generally led to difficult eigenv...
AbstractAn elliptic partial differential operator satisfies the Gårding inequality, which leads to a...
We examine the operator algebra A behind the boundary integral equation method for solving transmiss...
Beyn W-J, Latushkin Y, Rottmann-Matthes J. Finding Eigenvalues of Holomorphic Fredholm Operator Penc...
We present an algorithm which, based on certain properties of analytic dependence, constructs bounda...
We review some recent results concerning nonlinear eigenvalue problems of the form (*) Au + eB(u) =c...
AbstractWe study singularly perturbed Fredholm equations of the second kind. We give sufficient cond...
We consider a broad class of linear operator equations that includes systems of ordinary differentia...
AbstractThe perturbed eigenvalue problem L(x)v(x) = λ(x)v(x) is considered near 0 = x ∈ R with L(x) ...
AbstractThis paper is a discussion of the perturbation of operators in certain of their invariant su...
By means of a suitable degree theory, we prove persistence of eigenvalues and eigenvectors for set-v...
Asymptotic and numerical methods are used to study several classes of singularly perturbed boundary ...