Refined behavior and structural universality of the blow-up profile for the semilinear heat equation with non scale invariant nonlinearity
Abstract
We consider the semilinear heat equation ut- u=f(u) for a large class of non scale invariant nonlinearities of the form f(u)=upL(u), where p>1 is Sobolev subcritical and L is a slowly varying function (which includes for instance logarithms and their powers and iterates, as well as some strongly oscillating functions). For any positive radial decreasing blow-up solution, we obtain the sharp, global blow-up profile in the scale of the original variables (x, t), which takes the form: u(x,t)=(1+o(1))\,G-1(T-t+p-18p|x|2| |x||), \ as (x,t) (0,T), where G(X)=∫X∞ dsf(s). This estimate in particular provides the sharp final space profile and the refined space-time profile. As a remarkable fact and completely new observation, our results reveal a structural universality of the global blow-up profile, being given by the "resolvent" G-1 of the ODE, composed with a universal, time-space building block, which is the same as in the pure power case.
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