A note on ED degrees of group-stable subvarieties in polar representations

Bik, Arthur; Draisma, Jan (2018). A note on ED degrees of group-stable subvarieties in polar representations. Israel journal of mathematics, 228(1), pp. 353-377. Springer 10.1007/s11856-018-1767-0

Preview

Text
1708.07696.pdf - Submitted Version
Available under License Publisher holds Copyright.
Download (196kB) | Preview

Preview

Text
Bik-Draisma2018_Article_ANoteOnEDDegreesOfGroup-stable.pdf - Published Version
Available under License Publisher holds Copyright.
Download (255kB) | Preview

In a recent paper, Drusvyatskiy, Lee, Ottaviani, and Thomas establish a "transfer principle" by means of which the Euclidean distance degree of an orthogonally-stable matrix variety can be computed from the Euclidean distance degree of its intersection with a linear subspace. We generalise this principle.

Item Type:	Journal Article (Original Article)
Division/Institute:	08 Faculty of Science > Department of Mathematics and Statistics > Institute of Mathematics
UniBE Contributor:	Bik, Michel Arthur, Draisma, Jan
Subjects:	500 Science > 510 Mathematics
ISSN:	0021-2172
Publisher:	Springer
Language:	English
Submitter:	Olivier Bernard Mila
Date Deposited:	08 May 2019 11:08
Last Modified:	05 Dec 2022 15:25
Publisher DOI:	10.1007/s11856-018-1767-0
BORIS DOI:	10.7892/boris.125495
URI:	https://boris.unibe.ch/id/eprint/125495

Actions (login required)

Edit item

A note on ED degrees of group-stable subvarieties in polar representations

Interest & Impact

Downloads

Citations

Search

Services

Actions (login required)

Item Type:

Division/Institute:

UniBE Contributor:

Subjects:

ISSN:

Publisher:

Language:

Submitter:

Date Deposited:

Last Modified:

Publisher DOI:

BORIS DOI:

URI:

Actions (login required)