JOURNAL ARTICLE
Symmetric polynomials over finite fields
Year: 2023 Journal: Finite Fields and Their Applications Vol: 89 Pages: 102224-102224 Publisher: Elsevier BV
Abstract
It is shown that two vectors with coordinates in the finite q-element field of characteristic p belong to the same orbit under the natural action of the symmetric group if each of the elementary symmetric polynomials of degree pk,2pk,…,(q−1)pk, k=0,1,2,… has the same value on them. This separating set of polynomial invariants for the natural permutation representation of the symmetric group is not far from being minimal when q=p and the dimension is large compared to p. A relatively small separating set of multisymmetric polynomials over the field of q elements is derived.
Keywords:
Mathematics Symmetric group Representation theory of the symmetric group Elementary symmetric polynomial Complete homogeneous symmetric polynomial Power sum symmetric polynomial Combinatorics Permutation group Symmetric polynomial Ring of symmetric functions Finite field Schur polynomial Permutation (music) Degree (music) Field (mathematics) Polynomial Dimension (graph theory) Action (physics) Orbit (dynamics) Pure mathematics Orthogonal polynomials Discrete orthogonal polynomials Mathematical analysis Difference polynomials Matrix polynomial Macdonald polynomials
Metrics
3
Cited By
0.77
FWCI (Field Weighted Citation Impact)
15
Refs
0.70
Citation Normalized Percentile
Is in top 1%
Is in top 10%
Citation History
Topics
Coding theory and cryptography
Physical Sciences → Computer Science → Artificial Intelligence
Finite Group Theory Research
Physical Sciences → Mathematics → Discrete Mathematics and Combinatorics
graph theory and CDMA systems
Physical Sciences → Engineering → Electrical and Electronic Engineering
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