Global self-similar solutions for Hardy-H\'enon equations with linear and quasilinear diffusion

Abstract

Global self-similar solutions to the parabolic Hardy-H\'enon equation ut= um+|x|σup, (x,t)∈RN×(0,∞), are classified in the range of exponents m≥1, p>m and σ>\-2,-N\. The classification varies strongly with respect to the celebrated Fujita and Sobolev critical exponents pF(σ)=m+σ+2N, pS(σ)= cases m(N+2σ+2)N-2, & if N≥3, \\[1mm] ∞, & if N∈\1,2\. cases Indeed, if p∈(pF(σ),pS(σ)), both equations admit self-similar solutions with either compact support (if m>1) or Gaussian-like tail as |x|∞ (if m=1), as well as a one-parameter family satisfying u(x,t) C|x|-(σ+2)/(p-m), as \ |x|∞. If p≥ pS(σ), there are only self-similar solutions with the latter algebraic tail, while for m<p≤ pF(σ) no global solutions exist. The results open the way for a deeper study of the role of these solutions in the dynamics of the Hardy-H\'enon equations.