# Existence of solutions to a general geometric elliptic variational   problem

**Authors:** Yangqin Fang, S{\l}awomir Kolasi\'nski

arXiv: 1704.06576 · 2018-04-25

## TL;DR

This paper proves the existence of solutions to a broad class of geometric elliptic variational problems involving inhomogeneous anisotropic functionals, using a novel deformation theorem and extending Almgren's foundational work.

## Contribution

It establishes existence results for minimizers within a flexible class of sets, including unrectifiable and non-compact competitors, with no restrictions on dimensions.

## Key findings

- Existence of minimizers as rectifiable sets.
- Development of a new smooth deformation theorem.
- Validation of spanning classes in homological and cohomological senses.

## Abstract

We consider the problem of minimising an inhomogeneous anisotropic elliptic functional in a class of closed $m$ dimensional subsets of $\mathbf{R}^n$ which is stable under taking smooth deformations homotopic to the identity and under local Hausdorff limits. We prove that the minimiser exists inside the class and is an $(\mathscr{H}^m,m)$~rectifiable set in the sense of Federer. The class of competitors encodes a notion of spanning a boundary. We admit unrectifiable and non-compact competitors and boundaries, and we make no restrictions on the dimension $m$ and the co-dimension $n-m$ other than $1 \le m < n$. An important tool for the proof is a novel smooth deformation theorem. The skeleton of the proof and the main ideas follow Almgren's 1968 paper. In the end we show that classes of sets spanning some closed set $B$ in homological and cohomological sense satisfy our axioms.

## Full text

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## References

40 references — full list in the complete paper: https://tomesphere.com/paper/1704.06576/full.md

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Source: https://tomesphere.com/paper/1704.06576