Multiresolution schemes for strongly degenerate parabolic equations in one space dimension

## 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

## Abstract The first‐order of accuracy difference scheme for approximately solving the multipoint nonlocal boundary value problem for the differential equation in a Hilbert space __H__, with self‐adjoint positive definite operator __A__ is presented. The stability estimates for the solution of th

plementing the characteristic equations with appropriate jump relations, i.e., by solving the corresponding local Rie- The present work is concerned with an application of the theory of characteristics to conservation laws with source terms in one mann problem. space dimension, such as the Euler e

## For suitable and F, we prove that all classical solutions of the quasilinear wave equation RR !( ( V )) V "F(), with initial data of compact support, develop singularities in "nite time. The assumptions on and F include in particular the model case O>, for q\*2, and "$1. The starting point of