Arbitrary Continuous Nonlinear PDEs through the Order Completion Method

In 1994 we showed that very large classes of systems of nonlinear PDEs have solutions which can be assimilated with usual measurable functions on the Euclidean domains of definition of the respective equations. Recently, the regularity of such solutions has significantly been improved by showing that they can in fact be assimilated with Hausdorff continuous functions. The method of solution of PDEs is based on the Dedekind order completion of spaces of smooth functions which are defined on the domains of the given equations. In this way, the method does not use functional analytic approaches, or any of the customary distributions, hyperfunctions, or other generalized functions. Type independent existence and regularity results for large classes of systems of nonlinear PDEs Ten years ago, in [4], the following significant threefold breakthrough was obtained with respect to solving large classes of nonlinear PDEs, see MR 95k:35002. Namely :