Some progress in the Dixmier Conjecture
Rings and Algebras
2022-10-04 v1
Abstract
Let and , where , be the standard generators of the first Weyl algebra over a field of characteristic zero. Then the spectrum of the inner derivation on are exactly the set of integers. The algebra is a -graded algebra with each -component being the -eigenspace of , where . The Dixmier Conjecture says that if some elements and of satisfy , then they generate . We show that if either or possesses no component belonging to the negative spectrum of , then the Dixmier Conjecture holds. We give some generalization of this result, and some other useful criterions for and to generate . An important tool in our proof is the Newton polygon for elements in .
Cite
@article{arxiv.2210.00257,
title = {Some progress in the Dixmier Conjecture},
author = {Gang Han and Bowen Tan},
journal= {arXiv preprint arXiv:2210.00257},
year = {2022}
}