Euler measure: Difference between revisions

From testwiki

Jump to navigation Jump to search

Latest revision as of 17:19, 21 June 2023

In measure theory, the Euler measure of a polyhedral set equals the Euler integral of its indicator function.

The magnitude of an Euler measure

By induction, it is easy to show that independent of dimension, the Euler measure of a closed bounded convex polyhedron always equals 1, while the Euler measure of a d-D relative-open bounded convex polyhedron is $(- 1)^{d}$ .^[1]

See also

Measure theory

Notes

Template:Reflist

External links

Exponentiation and Euler measure

Template:Measure theory Template:Analysis-stub

↑ Template:Cite web

Retrieved from "https://en.wiki.beta.math.wmflabs.org/w/index.php?title=Euler_measure&oldid=43287"