A new transformation for the subcritical fast diffusion equation with source and applications
Abstract
A new transformation for radially symmetric solutions to the subcritical fast diffusion equation with spatially inhomogeneous source ∂tu= um+|x|σup, posed for (x,t)∈RN×(0,∞) and with dimension and exponents N≥3, 0<m<mc:=N-2N, σ∈(-2,∞), is introduced. It plays a role of a kind of symmetry with respect to the critical exponents ms=N-2N+2, pL(σ)=1+σ(1-m)2, ps(σ)=m(N+2σ+2)N-2. This transformation is then applied for classifying self-similar solutions with or without finite time blow-up to the subcritical fast diffusion equation with source when p>\1,pL(σ)\, having as starting point previous results by the authors.
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