% Encoding: UTF-8
@COMMENT{BibTeX export based on data in FAU CRIS: https://cris.fau.de/}
@COMMENT{For any questions please write to cris-support@fau.de}
@article{faucris.108996844,
author = {Knop, Friedrich and Littelmann, Peter},
doi = {10.1007/BF01163656},
faupublication = {no},
journal = {Mathematische Zeitschrift},
keywords = {Let G be a semisimple group and V a finite-dimensional faithful representation of G. The ring of invariants is graded which gives rise to a generating function h(t). This function satisfies a functional equation h(1/t)=±t^q h(t). In an earlier paper, it was shown that q<=dim V. Furthermore, equality holds if and only if the set of all v in V with positive dimensional isotropy group has at least codimension two. This condition is satisfied for all "generic" representations. In the paper, all pairs (G,V) with q},
month = {Jan},
pages = {211-229},
peerreviewed = {Yes},
title = {{Der} {Grad} erzeugender {Funktionen} von {Invariantenringen}},
volume = {196},
year = {1987}
}