A Hardy-H\'enon equation in RN with sublinear absorption
Abstract
Consider m\>1, N 1 and \-2,-N\\<σ\<0. The Hardy-H\'enon equation with sublinear absorption(equation*- v(x) - |x|σ v(x) + 1m-1 v1/m(x)= 0, x∈RN,equation*is shown to have at least one solution v∈ H1(RN) L(m+1)/m(RN), which is non-negative and radially symmetric with a non-increasing profile. In addition, any such solution is compactly supported, bounded and enjoys the better regularity v∈ W2,q(RN) for q∈ [1,N/|σ|). A key ingredient in the proof is a particular case of the celebrated Caffarelli-Kohn-Nirenberg inequalities, for which we obtain the existence of an extremal function which is non-negative, bounded, compactly supported and radially symmetric with a non-increasing profile.A by-product of these results is the existence of compactly supported separate variables solutions to a porous medium equation with a spatially dependent source featuring a singular coefficient.
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