Contact geometry of multidimensional Monge-Amp\`ere equations: characteristics, intermediate integrals and solutions

TL;DR

This paper explores the contact geometric structure of multidimensional Monge-Ampère equations, linking their characteristics and integrals to contact geometry, and develops methods for solving associated Cauchy problems.

Contribution

It introduces a geometric framework for Goursat-type Monge-Ampère equations, characterizes their intermediate integrals, and provides criteria for contact equivalence and solution methods.

Findings

Characterization of Goursat-type MAEs via contact geometry

Link between intermediate integrals and characteristics

Method for solving Cauchy problems with intermediate integrals

Abstract

We study the geometry of multidimensional scalar $2^{nd}$ order PDEs (i.e. PDEs with $n$ independent variables) with one unknown function, viewed as hypersurfaces $\mathcal{E}$ in the Lagrangian Grassmann bundle $M^{(1)}$ over a $(2n+1)$-dimensional contact manifold $(M,\mathcal{C})$. We develop the theory of characteristics of the equation $\mathcal{E}$ in terms of contact geometry and of the geometry of Lagrangian Grassmannian and study their relationship with intermediate integrals of $\mathcal{E}$. After specifying the results to general Monge-Amp\`ere equations (MAEs), we focus our attention to MAEs of type introduced by Goursat, i.e. MAEs of the form $$ \det|\frac{\partial^2 f}{\partial x^i\partial x^j}-b_{ij}(x,f,\nabla f)\|=0. $$ We show that any MAE of the aforementioned class is associated with an $n$-dimensional subdistribution $\mathcal{D}$ of the contact distribution $\mathcal{C}$, and viceversa. We characterize this Goursat-type equations together with its intermediate integrals in terms of their characteristics and give a criterion of local contact equivalence. Finally, we develop a method of solutions of a Cauchy problem, provided the existence of a suitable number of intermediate integrals.