Determinantal Ideals and the Canonical Commutation Relations. Classically or Quantized
Abstract
We construct homomorphic images of in Weyl Algebras . More precisely, and using the Bernstein filtration of , is mapped into degree elements with the negative non-compact root spaces being mapped into second order creation operators. Using the Fock representation of , these homomorphisms give all unitary highest weight representations of thus reconstructing the Kashiwara--Vergne List for the Segal--Shale--Weil representation. Just as in the derivation of the their list, we construct a representation of in the Fock space commuting with , and this gives the multiplicities. The construction also gives an easy proof that the ideals of minors are prime (. The quotients of all polynomials by such ideals carry the more singular of the representations. As a consequence, these representations can be realized in spaces of solutions to Maxwell type equations. We actually go one step further and determine exactly which representations from our list are missing some -types, thereby revealing exactly which covariant differential operators have unitary null spaces. We prove the analogous results for . The Weyl Algebras are replaced by the Hayashi--Weyl Algebras and the Fock space by a -Fock space. Further, determinants are replaced by -determinants, and a commuting representation of in the -Fock space is constructed. For this purpose a Drinfeld Double is used. We mention one difference: The quantized negative non-compact root spaces, while still of degree 2, are no longer given entirely by second order creation operators.
Cite
@article{arxiv.2111.03378,
title = {Determinantal Ideals and the Canonical Commutation Relations. Classically or Quantized},
author = {Hans Plesner Jakobsen},
journal= {arXiv preprint arXiv:2111.03378},
year = {2021}
}
Comments
66 pages LaTeX