On the Hardy-H\'enon heat equation with an inverse square potential
Abstract
We study Cauchy problem for the Hardy-H\'enon parabolic equation with an inverse square potential, namely, \[∂tu - u+a|x|-2 u= |x|γ Fα(u),\] where a-(d-22)2, γ∈ R, α>1 and Fα(u)=μ |u|α-1u, μ|u|α or μ uα, μ∈ \-1,0,1\. We establish sharp fixed time-time decay estimates for heat semigroups e-t (- + a|x|-2) in weighted Lebesgue spaces. This may be of independent interest. As an application, we establish local well-posedness in scale subcritical and critical weighted Lebesgue spaces and small data global existence in critical weighted Lebesgue spaces. Further, under certain conditions on γ and α, we show that local solution cannot be extended to global one for certain initial data in the subcritical regime. Thus, finite time blow-up in the subcritical Lebesgue space norm is exhibited. We also demonstrate nonexistence of local positive weak solution (and hence failure of local well-posedness) in supercritical case for α>1+2+γd the Fujita exponent.
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