Investigation of difference schemes for quasilinear degenerate parabolic equations

## Abstract The discrete mollification method is a convolution‐based filtering procedure suitable for the regularization of ill‐posed problems and for the stabilization of explicit schemes for the solution of PDEs. This method is applied to the discretization of the diffusive terms of a known first

on the space X = L 2 (0; T ; V ), where Q = ×(0; T ) and V = W 1; 2 0 (v; ) is a weighted Sobolev space, see Section 2. The degeneration is determined by a scalar function b(x) and a vector function v(x) = (v 1 (x); v 2 (x); : : : ; v N (x)) with positive components v i (x) in satisfying certain int

We investigate the evolution problem u#m("Au")Au"0, u( where H is a Hilbert space, A is a self-adjoint linear non-negative operator on H with domain D(A), and We prove that if u 3D(A), and m("Au ")O0, then there exists at least one global solution, which is unique if either m never vanishes, or m