Local Exact Controllability to Stationary Solutions of a Semilinear Parabolic Equation

Abstract

This paper establishes the local exact controllability of the quasilinear porous media equation with Dirichlet boundary condition.\\ Consider the equation aligned &yt - a(y) = mu+f on Q\\ &y(0)=y0,\ y = 0 aligned on the n+1-dimensional cylinder Q = × (0, T) with lateral boundary = ∂ × (0, T). The exact controllability in finite time is proved when \|y0 - ys\|W1, n0() C( ) is sufficiently small, n > 1, for every stationary solution ys such that a(ys) ∈ W2, q(), where q>n. It is assumed that is a bounded open set with C2 boundary and that a ∈ C2( R), a'>0.