# A unifying representer theorem for inverse problems and machine learning

**Authors:** Michael Unser

arXiv: 1903.00687 · 2020-07-13

## TL;DR

This paper introduces a unifying representer theorem in Banach spaces that generalizes many existing results in regularization, inverse problems, and machine learning, providing a broad theoretical framework.

## Contribution

It presents a general representer theorem applicable to a wide class of optimization problems in Banach spaces, unifying various known results and introducing new insights.

## Key findings

- Unified framework for regularization problems
- Recovery of known representer theorems
- New results for sparsity and spike recovery

## Abstract

The standard approach for dealing with the ill-posedness of the training problem in machine learning and/or the reconstruction of a signal from a limited number of measurements is regularization. The method is applicable whenever the problem is formulated as an optimization task. The standard strategy consists in augmenting the original cost functional by an energy that penalizes solutions with undesirable behavior. The effect of regularization is very well understood when the penalty involves a Hilbertian norm. Another popular configuration is the use of an $\ell_1$-norm (or some variant thereof) that favors sparse solutions. In this paper, we propose a higher-level formulation of regularization within the context of Banach spaces. We present a general representer theorem that characterizes the solutions of a remarkably broad class of optimization problems. We then use our theorem to retrieve a number of known results in the literature---e.g., the celebrated representer theorem of machine leaning for RKHS, Tikhonov regularization, representer theorems for sparsity promoting functionals, the recovery of spikes---as well as a few new ones.

## Full text

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## References

58 references — full list in the complete paper: https://tomesphere.com/paper/1903.00687/full.md

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Source: https://tomesphere.com/paper/1903.00687