# Sobolev mappings: from liquid crystals to irrigation via degree theory

**Authors:** Jean Van Schaftingen

arXiv: 1702.00970 · 2017-02-06

## TL;DR

This paper explores Sobolev maps constrained to surfaces, highlighting their topological singularities characterized by degree theory, and connects these concepts to problems in liquid crystals, harmonic maps, and optimal transport.

## Contribution

It introduces a novel perspective linking topological singularities in Sobolev maps to optimal transportation of topological charges.

## Key findings

- Finite-energy singularities are characterized by topological degree.
- Topological obstructions prevent smooth approximation of Sobolev maps.
- Singularities act as sources and sinks in charge transportation problems.

## Abstract

Sobolev spaces are a natural framework for the analysis of problems in partial differential equations and calculus of variations. Some physical and geometric contexts, such as liquid crystals models and harmonic maps, lead to consider Sobolev maps, that is, Sobolev vector functions whose range is constrained in a surface or submanifold of the space. This additional nonlinear constraint provokes the appearance of finite-energy topological singularities. These singularities are characterized by a nontrivial topological invariant such as the topological degree, they represent an obstruction to the strong approximation by smooth maps and they become source and sink terms in an optimal transportation or irrigation problem of topological charges arising in the study of the weak approximation and of the relaxed energy.

## Full text

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## References

17 references — full list in the complete paper: https://tomesphere.com/paper/1702.00970/full.md

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Source: https://tomesphere.com/paper/1702.00970