Removable singularities for quasilinear degenerate elliptic equations with absorption term

Dedicated to Professor Kozo Yabuta on the occasion of his sixtieth birthday

抄録

Let N≥q 1 and p>1. Let F be a compact set and Ω be a bounded open set of \bm{R}^N satisfying F⊂Ω⊂ \bm{R}^N. We define a generalized p-harmonic operator L_p which is elliptic in Ω\backslash F and degenerated on F. We shall study the genuinely degenerate elliptic equations with absorption term. In connection with these equations we shall treat two topics in the present paper. Namely, the one is concerned with removable singularities of solutions and the other is the unique existence property of bounded solutions for the Dirichlet boundary problem.