Published Paper
Inserted: 20 may 2016
Last Updated: 20 may 2016
Journal: Journal of Geometry and Physics
Year: 2016
Doi: http://dx.doi.org/10.1016/j.geomphys.2016.04.021
Links:
online version
Abstract:
By studying the development of shock waves out of discontinuity waves, in 1954 P. Lax discovered a class of PDEs, which he called “completely exceptional”, where such a transition does not occur after a finite time. A straightforward integration of the completely exceptionality conditions allowed Boillat to show that such PDEs are actually of Monge–Ampère type. In this paper, we first recast these conditions in terms of characteristics, and then we show that the completely exceptional PDEs, with 2 or 3 independent variables, can be described in terms of the conformal geometry of the Lagrangian Grassmannian, where they are naturally embedded. Moreover, for an arbitrary number of independent variables, we show that the space of rth degree sections of the Lagrangian Grassmannian can be resolved via a BGG operator. In the particular case of 1st degree sections, i.e., hyperplane sections or, equivalently, Monge–Ampère equations, such operator is a close analog of the trace–free second fundamental form.
Tags:
MSC2014-GEOGRAL
Keywords:
Complete exceptional PDEs, Monge-Ampere, Characteristics of PDEs, Conformal geometry, Lagrangian Grassmannians, BGG resolution