AbstractAlmost periodicity of solutions of first- and second-order Cauchy problems on the real line is proved under the assumption that the imaginary (resp. real) spectrum of the underlying operator is countable. Related results have been obtained by Ruess–Vũ and Basit. Our proof uses a new idea. It is based on a factorisation method which also gives a short proof (of the vector-valued version) of Loomis' classical theorem, saying that a bounded uniformly continuous function from R into a Banach spaceXwith countable spectrum is almost periodic ifc0⊄X. Our method can also be used for solutions on the half-line. This is done in a separate paper
Abstract. We prove almost periodicity of solutions of the equation x′′(t)=Ax(t) when the linear oper...
AbstractWe first present some results about pseudo almost periodic functions. Then we use these resu...
In a sequentially weakly complete Banach space, if the dual operator of a linear operator A satisfie...
AbstractAlmost periodicity of solutions of first- and second-order Cauchy problems on the real line ...
We consider a mild solution u of a well-posed, inhomogeneous, Cauchy problem, u(t)=A(t)u(t)+f(t), on...
The existence of almost periodic, asymptotically almost periodic, almost automorphic, asymptotically...
Let u be a bounded slowly oscillating mild solution of an inhomogeneous Cauchy problem, u̇(t) = Au(t...
Castillo, G. (reprint author). Departamento de Matemática, Universidad de Talca, Talca, Chile. E-mai...
Abstract. We construct a Sobolev-type space of almost periodic functions, in which we study differen...
International audienceThe relationship between Carathéodory almost-periodic (a.p.) solutions and the...
Approaches to estimate the number of almost periodic solutions of ordinary differential equations ar...
AbstractIn this paper we present some quite simple results concerning almost-periodic solutions of a...
Existence of almost-periodic solutions to quasi-linear evolution inclusions under a Stepanov almost-...
AbstractIn Section 1, we present some results of pseudo almost periodic functions. Then we apply the...
Abstract. The linear dierential equation (q) : y00 = q(t)y with the uni-formly almost-periodic funct...
Abstract. We prove almost periodicity of solutions of the equation x′′(t)=Ax(t) when the linear oper...
AbstractWe first present some results about pseudo almost periodic functions. Then we use these resu...
In a sequentially weakly complete Banach space, if the dual operator of a linear operator A satisfie...
AbstractAlmost periodicity of solutions of first- and second-order Cauchy problems on the real line ...
We consider a mild solution u of a well-posed, inhomogeneous, Cauchy problem, u(t)=A(t)u(t)+f(t), on...
The existence of almost periodic, asymptotically almost periodic, almost automorphic, asymptotically...
Let u be a bounded slowly oscillating mild solution of an inhomogeneous Cauchy problem, u̇(t) = Au(t...
Castillo, G. (reprint author). Departamento de Matemática, Universidad de Talca, Talca, Chile. E-mai...
Abstract. We construct a Sobolev-type space of almost periodic functions, in which we study differen...
International audienceThe relationship between Carathéodory almost-periodic (a.p.) solutions and the...
Approaches to estimate the number of almost periodic solutions of ordinary differential equations ar...
AbstractIn this paper we present some quite simple results concerning almost-periodic solutions of a...
Existence of almost-periodic solutions to quasi-linear evolution inclusions under a Stepanov almost-...
AbstractIn Section 1, we present some results of pseudo almost periodic functions. Then we apply the...
Abstract. The linear dierential equation (q) : y00 = q(t)y with the uni-formly almost-periodic funct...
Abstract. We prove almost periodicity of solutions of the equation x′′(t)=Ax(t) when the linear oper...
AbstractWe first present some results about pseudo almost periodic functions. Then we use these resu...
In a sequentially weakly complete Banach space, if the dual operator of a linear operator A satisfie...