Lp-Asymptotic Profiles for the Heat Equation with a Hardy Potential

Abstract

For radial initial data, we construct explicit higher-order \(Lp( RN)\)-asymptotic profiles for the heat equation with Hardy potential. These profiles, denoted An are obtained from the small-argument expansion, up to an arbitrary order \(n\), of the modified Bessel function appearing in the radial Hardy heat kernel. If u is the mild solution generated by this kernel, we prove that the corresponding remainder u(x,t)-An(x,t) admits a polynomial decay depending on n in \(Lp( RN)\) as \(t∞\). We also treat the non-radial case through spherical harmonics: each angular mode evolves according to a radial Hardy heat equation with a modified parameter, leading to finite and infinite angular expansion versions of the asymptotic profile under suitable summability assumptions.

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