Add to ORKGWe introduce the notion of invariant subspaces for multilinear operators from which the invariant subspace problems for multilinear and polynomial operators arise. We prove that polynomial operators acting in a finite dimensional complex space and even polynomial operators acting in a finite dimensional real space have eigenvalues. These results enable us to prove that polynomial and multilinear operators acting in a finite dimensional complex space, even polynomial and even multilinear operators acting in a finite dimensional real space have nontrivial invariant subspaces. Furthermore, we prove that odd polynomial operators acting in a finite dimensional real space either have eigenvalues or are homotopic to scalar operators; we then use t...
AbstractLet T be a polynomially bounded operator on a Banach space X whose spectrum contains the uni...
AbstractWe give a characterization of invariant subspaces of finite codimension in Banach spaces of ...
The notion of an invariant subspace is fundamental to the subject of operator theory. Given an opera...
AbstractElementary arguments are used to establish equivalent conditions for an operator on a finite...
AbstractElementary arguments are used to establish equivalent conditions for an operator on a finite...
summary:We discuss the invariant subspace problem of polynomially bounded operators on a Banach spac...
summary:We discuss the invariant subspace problem of polynomially bounded operators on a Banach spac...
summary:We discuss the invariant subspace problem of polynomially bounded operators on a Banach spac...
Presents work on the invariant subspace problem, a major unsolved problem in operator theory
AbstractEvery invariant subspace of the commutant {A′} of an operator A is the range of some operato...
AbstractTwo linear operators A and B on a finite dimensional complex vector space have the same latt...
For any nonzero invariant subspace M in H2 (T2), set M x = [ U z nM] n [ U w nM] then Mx is also an ...
In this paper we derive structure theorems which characterize the spaces of linear and non-linear di...
AbstractWhile the algebra of infinite matrices is more or less reasonable, the analysis is not. Ques...
AbstractWhile the algebra of infinite matrices is more or less reasonable, the analysis is not. Ques...
AbstractLet T be a polynomially bounded operator on a Banach space X whose spectrum contains the uni...
AbstractWe give a characterization of invariant subspaces of finite codimension in Banach spaces of ...
The notion of an invariant subspace is fundamental to the subject of operator theory. Given an opera...
AbstractElementary arguments are used to establish equivalent conditions for an operator on a finite...
AbstractElementary arguments are used to establish equivalent conditions for an operator on a finite...
summary:We discuss the invariant subspace problem of polynomially bounded operators on a Banach spac...
summary:We discuss the invariant subspace problem of polynomially bounded operators on a Banach spac...
summary:We discuss the invariant subspace problem of polynomially bounded operators on a Banach spac...
Presents work on the invariant subspace problem, a major unsolved problem in operator theory
AbstractEvery invariant subspace of the commutant {A′} of an operator A is the range of some operato...
AbstractTwo linear operators A and B on a finite dimensional complex vector space have the same latt...
For any nonzero invariant subspace M in H2 (T2), set M x = [ U z nM] n [ U w nM] then Mx is also an ...
In this paper we derive structure theorems which characterize the spaces of linear and non-linear di...
AbstractWhile the algebra of infinite matrices is more or less reasonable, the analysis is not. Ques...
AbstractWhile the algebra of infinite matrices is more or less reasonable, the analysis is not. Ques...
AbstractLet T be a polynomially bounded operator on a Banach space X whose spectrum contains the uni...
AbstractWe give a characterization of invariant subspaces of finite codimension in Banach spaces of ...
The notion of an invariant subspace is fundamental to the subject of operator theory. Given an opera...