6533b851fe1ef96bd12a8bca

RESEARCH PRODUCT

Invariants of unipotent groups

Klaus Pommerening

subject

Pure mathematicsRing (mathematics)Infinite fieldRational singularityUnipotentReductive groupComplex numberAffine planeMathematics

description

I’ll give a survey on the known results on finite generation of invariants for nonreductive groups, and some conjectures. You know that Hilbert’s 14th problem is solved for the invariants of reductive groups; see [12] for a survey. So the general case reduces to the case of unipotent groups. But in this case there are only a few results, some negative and some positive. I assume that k is an infinite field, say the complex numbers, but in most instances an arbitrary ring would do it.

yearjournalcountryeditionlanguage
1987-01-01
https://doi.org/10.1007/bfb0078803