Local well-posedness and global existence for the biharmonic heat equation with exponential nonlinearity

Abstract

In this paper we prove local well-posedness in Orlicz spaces for the biharmonic heat equation ∂t u+ 2 u=f(u),\;t>0,\;x∈N, with f(u) eu2 for large u. Under smallness condition on the initial data and for exponential nonlinearity f such that f(u) um as u 0, m integer and N(m-1)/4≥ 2, we show that the solution is global. Moreover, we obtain a decay estimates for large time for the nonlinear biharmonic heat equation as well as for the nonlinear heat equation. Our results extend to the nonlinear polyharmonic heat equation.