On an algebraic identity and formula Jacobi—Trudi
DOI:
https://doi.org/10.21638/11701/spbu01.2016.101Abstract
The first Jacobi—Trudi identity expresses Schur polynomials as certain determinants of matrices whose entries are complete homogeneous polynomials. The definition of Schur polynomials was given by Cauchy in 1815 as a quotient of certain determinants defined by an integer partition with at most n non-zero parts. Schur functions became very important because of their close relationship with the irreducible characters of both the symmetric groups and the general linear groups, and for their combinatorial applications. The Jacobi—Trudi identity was first stated by Jacobi in 1841 and proved by Nicola Trudi in 1864. Since then this identity and its numerous generalizations have been the focus of much attention due to the important role they play in various areas of mathematics including mathematical physics, representation theory, and algebraic geometry, and various proofs based on different ideas (in particular, a natural combinatorial proof using Young tableaux techniques) have been found. In our paper, we give a short and simple proof of the first Jacobi—Trudi identity and discuss its relationship with some other well-known polynomial identities. Refs 3.Downloads
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References
Литература
1. Grosov M.S., Taiani G. Vandermonde strikes again // The American Mathematical Monthly. Vol. 100, N 6. 1993. P. 575-577.
2. Прасолов В.В. Задачи и теоремы линейной алгебры. 2-е изд. М., 2008. 536 с.
3. Cornelius E.F., JR. Identities for complete homogeneous symmetric polinomials // JP Journal of Algebra, Number Theory and Applications. Vol. 21, N 1. 2011. P. 109-116.
References
1. Grosov M. S., Taiani G., “Vandermonde strikes again”, The American Mathematical Monthly 100(6), 575–577 (1993).
2. Prasolov V.V., Problems and Theorems in Linear Algebra (2nd ed. Moscow, 2008, 536 p.) [in Russian].
3. Cornelius E.F., JR., “Identities for complete homogeneous symmetric polinomials”, JP Journal of Algebra, Number Theory and Applications 21(1), 109–116 (2011).
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Published
2020-10-19
How to Cite
Bekker, B. M., Ivanov, O. A., & Merkuriev, A. S. (2020). On an algebraic identity and formula Jacobi—Trudi. Vestnik of Saint Petersburg University. Mathematics. Mechanics. Astronomy, 3(1), 1. https://doi.org/10.21638/11701/spbu01.2016.101
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Section
Mathematics
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Articles of "Vestnik of Saint Petersburg University. Mathematics. Mechanics. Astronomy" are open access distributed under the terms of the License Agreement with Saint Petersburg State University, which permits to the authors unrestricted distribution and self-archiving free of charge.
