On variable Lebesgue spaces and generalized nonlinear heat equations
Abstract
In this work we address some questions concerning the Cauchy problem for a generalized nonlinear heat equations considering as functional framework the variable Lebesgue spaces Lp(·)(Rn). More precisely, by mixing some structural properties of these spaces with decay estimates of the fractional heat kernel, we were able to prove two well-posedness results for these equations. In a first theorem, we prove the existence and uniqueness of global-in-time mild solutions in the mixed-space Lp(·) nb2α - 1 γ (Rn,L∞([0,T[ )). On the other hand, by introducing a new class of variable exponents, we demonstrate the existence of an unique local-in-time mild solution in the space Lp(·) ( [0,T], Lq (R3) ).
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