The main result of this thesis is an existence result for parabolic semi-linear problems. This is done by reformulating the semi-linear problem as an abstract Cauchy problem ut(t) = Au(t) + f(t; u(t)), t > 0 u(0) = u0 (1) for u0 2 X, where X is a Banach space. We then develop and use the theory of compact semigroups to prove an existence result. In order to make this result applicable, we give a characterization of compact semigroups in terms of its resolvent operator and continuity in the uniform operator topology. Thus, using the theory of analytic semigroups, we are able to determine under what conditions on A a solution to (1) exists. Furthermore, we consider the asymptotic behaviour and regularity of such solutions. By deve...
This research monograph deals with nonlinear evolution operators and semigroups generated by dissipa...
The paper is devoted to studying solution operators semigroups and its generators for abstract Cauch...
AbstractWe consider semilinear parabolic systems ut + Au + f(u) = g, u(0) = u0, −A being the generat...
Neste trabalho, apresentamos uma introdução à Teoria de semigrupos analíticos de operadores lineare...
The book shows how the abstract methods of analytic semigroups and evolution equations in Banach spa...
We prove the existence of regular solutions for the quasi-linear evolution $$ {d over dt}(x(t)+g(t,x...
AbstractWe consider the semilinear Volterra integrodifferential equation u′ (t) + A(t)u(t) = ∫t0t a(...
In this paper, a parabolic functional differential equation is considered in the spaces C(0; T;H1 p ...
This paper provides a carefull and accessible exposision of the theory of analytic semigroups which ...
AbstractEvery semigroup T on a Banach space X can be used to define elements u∈X of exponential type...
This second edition explores the relationship between elliptic and parabolic initial boundary value ...
In this Thesis I present the general theory of semigroups of linear operators. From the philosophica...
This book presents an operator-theoretic approach to ill-posed evolution equations. It presents the ...
AbstractWe prove existence, smoothness and ergodicity results for semilinear parabolic problems on i...
We are concerned with the determination of the asymptotic behaviour of strong solutions to the initi...
This research monograph deals with nonlinear evolution operators and semigroups generated by dissipa...
The paper is devoted to studying solution operators semigroups and its generators for abstract Cauch...
AbstractWe consider semilinear parabolic systems ut + Au + f(u) = g, u(0) = u0, −A being the generat...
Neste trabalho, apresentamos uma introdução à Teoria de semigrupos analíticos de operadores lineare...
The book shows how the abstract methods of analytic semigroups and evolution equations in Banach spa...
We prove the existence of regular solutions for the quasi-linear evolution $$ {d over dt}(x(t)+g(t,x...
AbstractWe consider the semilinear Volterra integrodifferential equation u′ (t) + A(t)u(t) = ∫t0t a(...
In this paper, a parabolic functional differential equation is considered in the spaces C(0; T;H1 p ...
This paper provides a carefull and accessible exposision of the theory of analytic semigroups which ...
AbstractEvery semigroup T on a Banach space X can be used to define elements u∈X of exponential type...
This second edition explores the relationship between elliptic and parabolic initial boundary value ...
In this Thesis I present the general theory of semigroups of linear operators. From the philosophica...
This book presents an operator-theoretic approach to ill-posed evolution equations. It presents the ...
AbstractWe prove existence, smoothness and ergodicity results for semilinear parabolic problems on i...
We are concerned with the determination of the asymptotic behaviour of strong solutions to the initi...
This research monograph deals with nonlinear evolution operators and semigroups generated by dissipa...
The paper is devoted to studying solution operators semigroups and its generators for abstract Cauch...
AbstractWe consider semilinear parabolic systems ut + Au + f(u) = g, u(0) = u0, −A being the generat...