Convex integration with avoidance and hyperbolic (4,6) distributions

Publication date

2021-12-29

Authors

Martínez Aguinaga, Francisco Javier
del Pino Gomez, Alvaro

Editors

Advisors

Supervisors

DOI

Document Type

/dk/atira/pure/researchoutput/researchoutputtypes/workingpaper/preprint
Open Access logo

License

No license information available

Abstract

This paper tackles the classification, up to homotopy, of tangent distributions satisfying various non-involutivity conditions. All of our results build on Gromov's convex integration. For completeness, we first prove that that the full h-principle holds for step-2 bracket-generating distributions. This follows from classic convex integration, no refinements of the theory are needed. The classification of (3,5) and (3,6) distributions follows as a particular case. We then move on to our main example: A complete h-principle for hyperbolic (4,6) distributions. Even though the associated differential relation fails to be ample along some principal subspaces, we implement an "avoidance trick" to ensure that these are avoided during convex integration. Using this trick we provide the first example of a differential relation that is ample in coordinate directions but not in all directions, answering a question of Eliashberg and Mishachev. This so-called "avoidance trick" is part of a general avoidance framework, which is the main contribution of this article. Given any differential relation, the framework attempts to produce an associated object called an "avoidance template". If this process is successful, we say that the relation is "ample up to avoidance" and we prove that convex integration applies. The example of hyperbolic (4,6) distributions shows that our framework is capable of addressing differential relations beyond the applicability of classic convex integration.

Keywords

Citation

Martínez Aguinaga , F J & del Pino Gomez , A 2021 ' Convex integration with avoidance and hyperbolic (4,6) distributions ' arXiv , pp. 1-49 . < https://arxiv.org/abs/2112.14632 >