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Analogues of the Newton formulas for the block-symmetric polynomials on $\ell_p(\mathbb{C}^s)$

Viktoriia Kravtsiv

2020Carpathian Mathematical Publications19 citationsDOIOpen Access PDF

Abstract

The classical Newton formulas gives recurrent relations between algebraic bases of symmetric polynomials. They are true, of course, for symmetric polynomials on infinite-dimensional sequences Banach space. In this paper we consider block-symmetric polynomials (or MacMahon symmetric polynomials) on Banach spaces $\ell_p(\mathbb{C}^s),$ $1\le p\le \infty.$ We prove an analogue of the Newton formula for the block-symmetric polynomials for the case $p=1.$ In the case $1< p$ we have no classical elementary block-symmetric polynomials. However, we extend the obtained Newton type formula for $\ell_1(\mathbb{C}^s)$ to the case of $\ell_p(\mathbb{C}^s),$ $1< p\le \infty$ and by this way found a natural definition of elementary block-symmetric polynomials on $\ell_p(\mathbb{C}^s).$

Topics & Concepts

MathematicsElementary symmetric polynomialRing of symmetric functionsCombinatoricsSymmetric polynomialComplete homogeneous symmetric polynomialBanach spaceBlock (permutation group theory)Symmetric spaceAlgebraic numberPower sum symmetric polynomialSpace (punctuation)Orthogonal polynomialsPure mathematicsPolynomialMacdonald polynomialsDiscrete orthogonal polynomialsDifference polynomialsMathematical analysisMatrix polynomialPhilosophyLinguisticsAdvanced Banach Space TheoryAdvanced Numerical Analysis TechniquesHolomorphic and Operator Theory