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Quasilinear parabolic problem with p(x)-laplacian: existence, uniqueness of weak solutions and stabilization
Abstract: Abstract. We discuss the existence and uniqueness of the weak solution of the following quasilinear parabolic equationinvolving the p(x)-Laplacian operator. Next, we discuss the global behaviour of solutions and in particular some stabilization properties.Mathematics Subject Classification (2010). Primary 35K55, 35J62; Secondary 35B65.
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Cited by 22 publications
(14 citation statements)
References 25 publications
(45 reference statements)
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“…Proof. A similar result exists in [13] or in [16] without the term k β |A k,R | p p * +ε . For the reader's convenience, we include the complete proof.…”
Section: An Application To Nonhomogeneous Operatorssupporting
confidence: 70%
“…Proof. A similar result exists in [13] or in [16] without the term k β |A k,R | p p * +ε . For the reader's convenience, we include the complete proof.…”
Section: An Application To Nonhomogeneous Operatorssupporting
confidence: 70%
“…So, it is relevant to establish a new version of the Picone identity to include a large class of nonstandard p(x)-growth problems. In [14,16,22] convexity arguments to homogeneous functionals have been used to deal with quasilinear elliptic and parabolic problems with variable exponents. In the present paper, taking advantage of our new Picone pointwise identity, we give further applications in the context of elliptic and parabolic problems.…”
Section: Introduction and Main Resultsmentioning
confidence: 99%
“…In specific, the importance of investigating these kinds of problems lies in modeling of various anisotropic features that occur in electrorheological flows, image restoration, filtration process in complex media, stratigraphy problems and heterogeneous biological interactions. In the literature, there are many works that explore the questions of existence (local or global), regularity or behaviour of solutions for parabolic equations with variable exponent, for example [1,2,3,6,10,29,30]. Prior investigations have implemented diverse approaches to study the elliptic and parabolic problems with nonstandard growth.…”
Section: Introduction and Main Resultsmentioning
confidence: 99%
“…Next we recall Lemma A.1 in [17] for variable exponent Lebesgue spaces which is used to prove that J satisfies Palais-Smale condition.…”
Section: Proof Of Theorem 21mentioning
confidence: 99%
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