Implicit operator differential equations and applications to electrodynamics

## Communicated by G. F. Roach The Lyapunov stability is analysed for a class of integro-differential equations with unbounded operator coefficients. These equations arise in the study of non-conservative stability problems for viscoelastic thin-walled elements of structures. Some sufficient stabi

A novel framework for solving variational problems and partial differential equations for scalar and vector-valued data defined on surfaces is introduced in this paper. The key idea is to implicitly represent the surface as the level set of a higher dimensional function and to solve the surface equa

We introduce new methods of complex analysis (inequalities of Bernstein type) to study projections of analytic sets. These techniques are applied to problems of bifurcations of periodic orbits of differential equations such as the local Hilbert's 16 th problem. 1997 Academic Press ## I. INTRODUCTI

## Abstract Nonlinear hyperbolic functional differential equations with initial boundary conditions are considered. Theorems on the convergence of difference schemes and error estimates of approximate solutions are presented. The proof of the stability of the difference functional problem is based