arXiv:1103.1721 Abstract | arXiv Analytics

arXiv:1103.1721 [math.RT]Abstract References Reviews Resources

Invariant differential operators on a class of multiplicity free spaces

Published 2011-03-09, updated 2014-02-13Version 2

If $(G,V)$ is a multiplity free space with a one dimensional quotient we give generators and relations for the non-commutative algebra $D(V)^{G'}$ of invariant differential operators under the semi-simple part $G'$ of the reductive group $G$. More precisely we show that $D(V)^{G'}$ is the quotient of a Smith algebra by a completely described two-sided ideal.

Comments: 31 pages

Categories: math.RT, math.RA

Keywords: invariant differential operators, multiplicity free spaces, multiplity free space, smith algebra, dimensional quotient

Related articles: Most relevant | Search more

arXiv:1205.0628 [math.RT] (Published 2012-05-03)

Multiplicity free spaces with a one dimensional quotient

Hubert Rubenthaler

arXiv:0910.5664 [math.RT] (Published 2009-10-29)

Algebras of invariant differential operators on a class of multiplicity free spaces

Hubert Rubenthaler

arXiv:1506.06229 [math.RT] (Published 2015-06-20)

Decomposition of modules over invariant differential operators