English

Evaluation and spanning sets of confluent Vandermonde forms

Mathematical Physics 2022-09-21 v1 math.MP Representation Theory Quantum Physics

Abstract

An arbitrary derivative of a Vandermonde form in NN variables is given as [n1nN][n_1\cdots n_N], where the ii-th variable is differentiated Nni1N-n_i-1 times, 1niN11\le n_i\le N-1. A simple decoding table is introduced to evaluate it by inspection. The special cases where 0ni+1ni10\le n_{i+1} - n_i \le 1 for 0<i<N0<i<N are in one-to-one correspondence with ribbon Young diagrams. The respective N!N! standard ribbon tableaux map to a complete graded basis in the space of SNS_N-harmonic polynomials. The mapping is realized as an efficient algorithm generating any one of N!N! bases with N!N! basis elements, both indexed by permutations. The result is placed in the context of a geometric interpretation of the Hilbert space of many-fermion wave functions.

Keywords

Cite

@article{arxiv.2209.02523,
  title  = {Evaluation and spanning sets of confluent Vandermonde forms},
  author = {D. K. Sunko},
  journal= {arXiv preprint arXiv:2209.02523},
  year   = {2022}
}

Comments

Author's final version accepted in J. Math. Phys., 15 pages, 1 figure

R2 v1 2026-06-28T00:48:27.922Z