Characterizations of multidimensional compact almost automorphic functions and applications to Poissons and heat equations
Abstract
Let \(G\) be a non-empty subset of the Euclidean space \(Rm\) (\(m ≥ 1\)). This work is dedicated to further exploring the properties of \(G\)-multi-almost automorphic functions defined on \(Rm\) with values in a Banach space \(X\). Using the theory of \(G\)-multi-almost automorphic functions, we provide two new characterizations of compact almost automorphic functions. In the first characterization, \(G\) corresponds to the lattice subgroup \(Zm ⊂ Rm\); in the second, \(G\) is taken to be a dense subset of \(Rm\). Furthermore, we establish the invariance of the space of bounded and compactly \(G\)-multi-almost automorphic functions under integral operators with Bi-almost automorphic kernels. Finally, we present applications to the analysis of the almost automorphic dynamics of Poisson's equation and the heat equation.
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