Curvature of a measure

id: curvature-of-a-measure-261-8941108
title: Curvature of a measure
text: In mathematics, the curvature of a measure defined on the Euclidean plane R2 is a quantification of how much the measure's "distribution of mass" is "curved". It is related to notions of curvature in geometry. In the form presented below, the concept was introduced in 1995 by the mathematician Mark S. Melnikov; accordingly, it may be referred to as the Melnikov curvature or Menger-Melnikov curvature. Melnikov and Verdera (1995) established a powerful connection between the curvature of measures
brand slug: wiki
category slug: encyclopedia
description:
original url: https://en.wikipedia.org/wiki/Curvature_of_a_measure
date created:
date modified: 2023-12-03T10:54:17Z
main entity: {"identifier":"Q5196055","url":"https://www.wikidata.org/entity/Q5196055"}
image:
fields total: 13
integrity: 13

Related Entries

Explore Next Part