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Main Authors: Cerf, Raphaël, Mariconda, Carlo
Format: Preprint
Published: 2024
Subjects:
Online Access:https://arxiv.org/abs/2404.02901
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author Cerf, Raphaël
Mariconda, Carlo
author_facet Cerf, Raphaël
Mariconda, Carlo
contents The basic problem of the calculus of variations consists of finding a function that minimizes an energy, like finding the fastest trajectory between two points for a point mass in a gravity field moving without friction under the influence of gravity or finding the best shape of a wing. The existence of a solution may be established in quite abstract spaces, much larger than the space of smooth functions. An important practical problem is that of being able to approach the value of the infimum of the energy. However, numerical methods work with very concrete functions and sometimes they are unable to approximate the infimum: this is the surprising Lavrentiev phenomenon. The papers that ensure the non-occurrence of the phenomenon form a recent saga, and the most general result formulated in the early '90s was actually fully proved just recently, more than 30 years later. Our aim here is to introduce the reader to the calculus of variations, to illustrate the Lavrentiev phenomenon with the simplest known example, and to give an elementary proof of the non-occurrence of the phenomenon.
format Preprint
id arxiv_https___arxiv_org_abs_2404_02901
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle The Lavrentiev phenomenon
Cerf, Raphaël
Mariconda, Carlo
Optimization and Control
The basic problem of the calculus of variations consists of finding a function that minimizes an energy, like finding the fastest trajectory between two points for a point mass in a gravity field moving without friction under the influence of gravity or finding the best shape of a wing. The existence of a solution may be established in quite abstract spaces, much larger than the space of smooth functions. An important practical problem is that of being able to approach the value of the infimum of the energy. However, numerical methods work with very concrete functions and sometimes they are unable to approximate the infimum: this is the surprising Lavrentiev phenomenon. The papers that ensure the non-occurrence of the phenomenon form a recent saga, and the most general result formulated in the early '90s was actually fully proved just recently, more than 30 years later. Our aim here is to introduce the reader to the calculus of variations, to illustrate the Lavrentiev phenomenon with the simplest known example, and to give an elementary proof of the non-occurrence of the phenomenon.
title The Lavrentiev phenomenon
topic Optimization and Control
url https://arxiv.org/abs/2404.02901