A note on well-posedness of semilinear reaction-diffusion problem with singular initial data

Abstract

We discuss conditions for well-posedness of the scalar reaction-diffusion equation ut= u+f(u) equipped with Dirichlet boundary conditions where the initial data is unbounded. Standard growth conditions are juxtaposed with the no-blow-up condition ∫1∞1/f(s) s=∞ that guarantees global solutions for the related ODE u=f(u). We investigate well-posedness of the toy PDE ut=f(u) in Lp under this no-blow-up condition. An example is given of a source term f and an initial condition ∈ L2(0,1) such that ∫1∞1/f(s) s=∞ and the toy PDE blows-up instantaneously while the reaction-diffusion equation is globally well-posed in L2(0,1).