Memoirs of the American Mathematical Society
2 total works
Type II Blow Up Manifolds for the Energy Supercritical Semilinear Wave Equation
by Charles Collot
Published 30 April 2018
On the Stability of Type I Blow Up for the Energy Super Critical Heat Equation
by Charles Collot, Pierre Raphael, and Jeremie Szeftel
Published 1 October 2019
The authors consider the energy super critical semilinear heat equation $\partial _{t}u=\Delta u u^{p}, x\in \mathbb{R}^3, p>5.$ The authors first revisit the construction of radially symmetric self similar solutions performed through an ode approach and propose a bifurcation type argument which allows for a sharp control of the spectrum of the corresponding linearized operator in suitable weighted spaces. They then show how the sole knowledge of this spectral gap in weighted spaces implies the finite codimensional nonradial stability of these solutions for smooth well localized initial data using energy bounds. The whole scheme draws a route map for the derivation of the existence and stability of self-similar blow up in nonradial energy super critical settings.