Motivated by the recent works by the first and the second named authors, in this paper we introduce the notion of doubly-weighted pseudo-almost periodicity (respectively, doubly-weighted pseudo-almost automorphy) using theoretical measure theory. Basic properties of these new spaces are studied. To illustrate our work, we study, under Acquistapace-Terreni conditions and exponential dichotomy, the existence of (µ, ν)pseudo almost periodic (respectively, (µ, ν)-pseudo almost automorphic) solutions to some nonautonomous partial evolution equations in Banach spaces. A few illustrative examples will be discussed at the end of the paper. RESUMEN Motivado por los trabajos recientes del primer y segundo autor, en este artículo introducimos la noción de seudo-casi periodicidad con doble peso (seudo-casi automorfía con doble peso respectivamente) usando Teoría de la Medida. Se estudian las propiedades básicas de estos espacios nuevos. Para ilustrar nuestro trabajo, bajo las condiciones de Acquistapace-Terreni y dicotomía exponencial estudiamos la existencia de soluciones (respectivamente, (µ, ν) seudo-casi periódicas (µ, ν) seudo-casi automórficas) para algunas ecuaciones parciales de evolución autónomas en espacios de Banach. Algunos ejemplos ilustrativos se discutirán al final del artículo.
The aim of this work is to study the new concept of the (µ, ν)-pseudo almost automorphic functions for some non-autonomous differential equations. We suppose that the linear part has an exponential dichotomy. The nonlinear part is assumed to be (µ, ν)-pseudo almost automorphic. We show some results regarding the completness and the invariance of the space consisting in (µ, ν)-pseudo almost automorphic functions. Then we propose to study the existence of (µ, ν)-pseudo almost automorphic solutions for some differential equations involving reflection of the argument.
In this work, we present a new concept of measure-ergodic process to define
the space of measure pseudo almost periodic process in the p-th mean sense.
We show some results regarding the completeness, the composition theorems
and the invariance of the space consisting in measure pseudo almost periodic
process. Motivated by above mentioned results, the Banach fixed point
theorem and the stochastic analysis techniques, we prove the existence,
uniqueness and the global exponential stability of doubly measure pseudo
almost periodic mild solution for a class of nonlinear delayed stochastic
evolution equations driven by Brownian motion in a separable real Hilbert
space. We provide an example to illustrate the effectiveness of our results.
By developing new efficient techniques and using an appropriate fixed point theorem, we derive several new sufficient conditions for the pseudo almost periodic solutions with double measure for some system of differential equations with delays. As an application, we consider certain models for neural networks with delays.
UDC 517.9
Our aim is to present the concept of double-measure ergodic and double-measure pseudo almost periodic functions in Stepanov's sense. In addition, we present numerous interesting results, such as the composition theorems and completeness properties for these two spaces of the considered functions. We also establish the existence and uniqueness for the double-measure pseudo almost periodic mild solutions in Stepanov's sense for some evolution equations.
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