Existence theory of the nonlinear plate equations
Abstract
This paper is devoted to the theoretical analysis of the nonlinear plate equations in Rn× (0,∞), n≥1, with nonlinearity involving a type polynomial behavior. We prove the existence and uniqueness of global mild solutions for small initial data in L1(Rn) Hs(Rn)-spaces. We also prove the existence and uniqueness of local and global solutions in the framework of Bessel-potential spaces Hsp(Rn)=(I-)s/2Lp(Rn). In order to derive the existence results we develop new time decay estimates of the solution of the corresponding linear problem.
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