A further remark on the density estimate for degenerate Allen-Cahn equations: p-type equations for 1<p<nn-1 with rough coefficients

Abstract

In this short remark on a previous paper SZ25, we continue the study of Allen-Cahn equations associated with Ginzburg-Landau energies equation* J(v,)=∫\F(∇ v,v,x)+W(v,x)\dx, equation* involving a Dirichlet energy F(,τ,x)||p and a degenerate double-well potential W(τ,x)(1-τ2)m. In contrast to SZ25, we remove all regularity assumptions on the Ginzburg-Landau energy. Then, with further assumptions that 1<p<nn-1 and that W(τ,x) is monotone in τ on both sides of 0, we establish a density estimate for the level sets of nontrivial minimizers |u|≤1.