English

A note on symmetric orderings

Quantum Algebra 2020-06-05 v2 Rings and Algebras

Abstract

Let A^n\hat{A}_n be the completion by the degree of a differential operator of the nn-th Weyl algebra with generators x1,,xn,1,,nx_1,\ldots,x_n,\partial^1,\ldots,\partial^n. Consider nn elements X1,,XnX_1,\ldots,X_n in A^n\hat{A}_n of the form Xi=xi+K=1l=1nj=1nxlpijK1,l()j, X_i = x_i + \sum_{K = 1}^\infty \sum_{l = 1}^n\sum_{j = 1}^n x_l p_{ij}^{K-1,l}(\partial)\partial^j, where pijK1,l()p^{K-1,l}_{ij}(\partial) is a degree (K1)(K-1) homogeneous polynomial in 1,,n\partial^1,\ldots,\partial^n, antisymmetric in subscripts i,ji,j. Then for any natural kk and any function i:{1,,k}{1,,n}i : \{1,\ldots,k\}\to\{1,\ldots,n\} we prove σΣ(k)Xiσ(1)Xiσ(k)1=k!xi1xik, \sum_{\sigma \in \Sigma(k)} X_{i_{\sigma(1)}}\cdots X_{i_{\sigma(k)}}\triangleright 1 = k! \,x_{i_1}\cdots x_{i_k}, where Σ(k)\Sigma(k) is the symmetric group on kk letters and \triangleright denotes the Fock action of the A^n\hat{A}_n on the space of (commutative) polynomials.

Keywords

Cite

@article{arxiv.2001.10463,
  title  = {A note on symmetric orderings},
  author = {Zoran Škoda},
  journal= {arXiv preprint arXiv:2001.10463},
  year   = {2020}
}

Comments

8 pages, v2: expositional improvements and corrections; the second half of the main theorem's proof written much more explicitly

R2 v1 2026-06-23T13:23:10.518Z