%0 Generic %1 citeulike:1319833 %A Fleischmann, P. %A Sezer, M. %A Shank, R. J. %A Woodcock, C. F. %D 2005 %K cyclic for groups noether numbers of order prime %T The Noether numbers for cyclic groups of prime order %U http://arxiv.org/abs/math.AC/0508075 %X The Noether number of a representation is the largest degree of an element in a minimal homogeneous generating set for the corresponding ring of invariants. We compute the Noether number for an arbitrary representation of a cyclic group of prime order, and as a consequence prove the "2p-3 conjecture".

@misc{citeulike:1319833, abstract = {The Noether number of a representation is the largest degree of an element in a minimal homogeneous generating set for the corresponding ring of invariants. We compute the Noether number for an arbitrary representation of a cyclic group of prime order, and as a consequence prove the "2p-3 conjecture".}, added-at = {2007-08-18T13:22:24.000+0200}, author = {Fleischmann, P. and Sezer, M. and Shank, R. J. and Woodcock, C. F.}, biburl = {https://www.bibsonomy.org/bibtex/28483646e5e25e35c8a65520e0be0f747/a_olympia}, citeulike-article-id = {1319833}, description = {citeulike}, eprint = {math.AC/0508075}, interhash = {5ce5a768ae2f8b5d49a290c67c1e94e0}, intrahash = {8483646e5e25e35c8a65520e0be0f747}, keywords = {cyclic for groups noether numbers of order prime}, month = Aug, priority = {2}, timestamp = {2007-08-18T13:22:27.000+0200}, title = {The Noether numbers for cyclic groups of prime order}, url = {http://arxiv.org/abs/math.AC/0508075}, year = 2005 }