Optimal approximation and growth of solutions to a class of elliptic partial differential equations

In this article, we prove a higher order interpolation result for square -integrable functions by using generalized coiflets. Convergence of approximation by using generalized coiflets is shown. Applications to wavelet -Galerkin approximation of elliptic partial differential equations and some numer

An algorithm to generate solutions for members of a class of completely integrable partial differential equations has been derived from a constructive proof of Frobenius' Theorem. The algorithm is implemented as a procedure in the computer algebra system Maple. Because the implementation uses the fa

## Abstract In this paper, a unified approach for analysing finite dimensional approximations to a class of partial differential equations boundary value problems (second‐kind Fredholm differential equations) is introduced. The approach is shown to be general despite of its extremely simple form. I

Let 0/R N (N 2) be an unbounded domain, and L m be a homogeneous linear elliptic partial differential operator with constant coefficients. In this paper we show, among other things, that rapidly decreasing L 1 -solutions to L m (in 0) approximate all L 1 -solutions to L m (in 0), provided there exis