Riemann integration, Lebesgue integration
line integral/contour integration
integration of differential forms
integration over supermanifolds, Berezin integral, fermionic path integral
Kontsevich integral, Selberg integral, elliptic Selberg integral
integration in ordinary differential cohomology
integration in differential K-theory
A Jordan content is a kind of content which may be used to define the Riemann integral of indicator functions over a bounded set, in the same way that Lebesgue measures are used to define the Lebesgue integral of indicator functions.
James Munkres, Analysis on Manifolds, Westview Press (1991) ISBN:0-201-31596-3
Wikipedia, Jordan content
Last revised on June 5, 2022 at 21:30:22. See the history of this page for a list of all contributions to it.