Non-abelian resonance: product and coproduct formulas
S. Papadima, and A. Suciu. volume 96 of Springer Proceedings in Mathematics and Statistics, page 269-280. Springer, (September 2014)cite arxiv:1312.1828 Comment: 12 pages.
Abstract
We investigate the resonance varieties attached to a commutative differential graded algebra and to a representation of a Lie algebra, with emphasis on how these varieties behave under finite products and coproducts.
%0 Book Section
%1 papadima2013nonabelian
%A Papadima, Stefan
%A Suciu, Alexander I.
%B Bridging Algebra, Geometry, and Topology
%D 2014
%E Denis Ibadula, Vim Weys
%I Springer
%K alex myown
%P 269-280
%T Non-abelian resonance: product and coproduct formulas
%U http://dx.doi.org/10.1007/978-3-319-09186-0_17
%V 96
%X We investigate the resonance varieties attached to a commutative differential graded algebra and to a representation of a Lie algebra, with emphasis on how these varieties behave under finite products and coproducts.
@inbook{papadima2013nonabelian,
abstract = {We investigate the resonance varieties attached to a commutative differential graded algebra and to a representation of a Lie algebra, with emphasis on how these varieties behave under finite products and coproducts.},
added-at = {2013-12-11T03:33:27.000+0100},
author = {Papadima, Stefan and Suciu, Alexander I.},
biburl = {https://www.bibsonomy.org/bibtex/29550d9e83bef955a73f0d02d2dcdebbd/asuciu},
booktitle = {Bridging Algebra, Geometry, and Topology},
editor = {Denis Ibadula, Vim Weys},
interhash = {9fef3789d4e08830e2e56e9e546a8dc9},
intrahash = {9550d9e83bef955a73f0d02d2dcdebbd},
keywords = {alex myown},
month = {sept},
note = {cite arxiv:1312.1828 Comment: 12 pages},
pages = {269-280},
publisher = {Springer},
series = {Springer Proceedings in Mathematics and Statistics},
timestamp = {2014-10-26T23:59:28.000+0100},
title = {Non-abelian resonance: product and coproduct formulas},
url = {http://dx.doi.org/10.1007/978-3-319-09186-0_17},
volume = 96,
year = 2014
}