2020
DOI: 10.1080/17476933.2020.1751136
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Variable order nonlocal Choquard problem with variable exponents

Abstract: In this article, we study the existence/multiplicity results for the following variable order nonlocal Choquard problem with variable exponents

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Cited by 36 publications
(34 citation statements)
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“…The space X is a separable reflexive Banach space, see previous studies 17,50 . We define the convex modular function ϱpfalse(·false)sfalse(·false):X by ϱp(·)s(·)(v)=2N|v(x)v(y)|p(x,y)|xy|N+p(x,y)s(x,y)dxdy+N|v(x)|p(x)dx, whose associated norm define by v=vϱp(·)s(·)=infγ>0:ϱp(·)s(·)vγ1, which is equivalent to the norm ‖ · ‖ X .…”
Section: Functional Analytic Setup and Preliminaries Resultsmentioning
confidence: 99%
“…The space X is a separable reflexive Banach space, see previous studies 17,50 . We define the convex modular function ϱpfalse(·false)sfalse(·false):X by ϱp(·)s(·)(v)=2N|v(x)v(y)|p(x,y)|xy|N+p(x,y)s(x,y)dxdy+N|v(x)|p(x)dx, whose associated norm define by v=vϱp(·)s(·)=infγ>0:ϱp(·)s(·)vγ1, which is equivalent to the norm ‖ · ‖ X .…”
Section: Functional Analytic Setup and Preliminaries Resultsmentioning
confidence: 99%
“…For classical Sobolev space theory such as constant order and constant exponential, see [43][44][45]. And for variable order, variable exponent cases, see [21,41].…”
Section: Preliminariesmentioning
confidence: 99%
“…In the framework of variable exponents involving fractional p(x, •)-Laplace operator with variable s(x, •)-order, such as Kirchhoff equations, Choquard equations, etc., there have been some papers on this topic-see [19,41,[47][48][49][50][51]. We point out that very recently in [47], Biswas et al firstly proved a embedding theorem for variable exponential Sobolev spaces and Hardy-Littlewood-Sobolev type result, and then they studied the existence of solutions for Choquard equations as follows…”
Section: Introductionmentioning
confidence: 99%