The Schur Harmonic Convexity of the Hamy Symmetric Function and Its Applications

We give a reverse inequality involving the elementary symmetric function by use of the Schur harmonic convexity theory. As applications, several new analytic inequalities for then-dimensional simplex are established.

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Schur-convexity, Schur-geometric and Schur-harmonic convexity for a composite function of complete symmetric function

SpringerPlus ◽

10.1186/s40064-016-1940-z ◽

2016 ◽

Vol 5 (1) ◽

Cited By ~ 5

Author(s):

Huan-Nan Shi ◽

Jing Zhang ◽

Qing-Hua Ma

Keyword(s):

Symmetric Function ◽

Composite Function ◽

Complete Symmetric Function ◽

Schur Convexity ◽

Harmonic Convexity

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Corrigenda to “On Non-Compact Operators in Weighted Ideal and Symmetric Function Spaces”

Georgian Mathematical Journal ◽

10.1515/gmj.2007.807 ◽

2007 ◽

Vol 14 (4) ◽

pp. 807-808

Author(s):

Giorgi Oniani

Keyword(s):

Symmetric Function ◽

Compact Operators ◽

Function Spaces ◽

J 13

Abstract Corrections to [Oniani, Georgian Math. J. 13: 501–514, 2006] are listed.

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Schur-convexity for compositions of complete symmetric function dual

Journal of Inequalities and Applications ◽

10.1186/s13660-020-02334-8 ◽

2020 ◽

Vol 2020 (1) ◽

Author(s):

Huan-Nan Shi ◽

Pei Wang ◽

Jian Zhang

Keyword(s):

Symmetric Function ◽

Complete Symmetric Function ◽

Schur Convexity

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The Schur multiplicative and harmonic convexities of the complete symmetric function

Mathematische Nachrichten ◽

10.1002/mana.200810197 ◽

2011 ◽

Vol 284 (5-6) ◽

pp. 653-663 ◽

Cited By ~ 30

Author(s):

Y.-M. Chu ◽

G.-D. Wang ◽

X.-H. Zhang

Keyword(s):

Symmetric Function ◽

Complete Symmetric Function

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On Stanley's chromatic symmetric function and clawfree graphs

Discrete Mathematics ◽

10.1016/s0012-365x(99)00106-5 ◽

1999 ◽

Vol 205 (1-3) ◽

pp. 229-234 ◽

Cited By ~ 5

Author(s):

Vesselin Gasharov

Keyword(s):

Symmetric Function ◽

Chromatic Symmetric Function

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The Hammond Series of a Symmetric Function and Its Application to P-Recursiveness

SIAM Journal on Algebraic and Discrete Methods ◽

10.1137/0604019 ◽

1983 ◽

Vol 4 (2) ◽

pp. 179-193 ◽

Cited By ~ 7

Author(s):

I. P. Goulden ◽

D. M. Jackson ◽

J. W. Reilly

Keyword(s):

Symmetric Function

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How to get the weak order out of a digraph ?

Discrete Mathematics & Theoretical Computer Science ◽

10.46298/dmtcs.2538 ◽

2015 ◽

Vol DMTCS Proceedings, 27th... (Proceedings) ◽

Author(s):

Francois Viard

Keyword(s):

Wreath Product ◽

Symmetric Function ◽

Coxeter Groups ◽

Symmetric Functions ◽

Weak Order ◽

Möbius Function ◽

Mobius Function ◽

Acyclic Digraph ◽

International Audience

International audience We construct a poset from a simple acyclic digraph together with a valuation on its vertices, and we compute the values of its Möbius function. We show that the weak order on Coxeter groups $A$$n-1$, $B$$n$, $Ã$$n$, and the flag weak order on the wreath product ℤ$r$ ≀ $S$$n$ introduced by Adin, Brenti and Roichman (2012), are special instances of our construction. We conclude by briefly explaining how to use our work to define quasi-symmetric functions, with a special emphasis on the $A$$n-1$ case, in which case we obtain the classical Stanley symmetric function. On construit une famille d’ensembles ordonnés à partir d’un graphe orienté, simple et acyclique munit d’une valuation sur ses sommets, puis on calcule les valeurs de leur fonction de Möbius respective. On montre que l’ordre faible sur les groupes de Coxeter $A$$n-1$, $B$$n$, $Ã$$n$, ainsi qu’une variante de l’ordre faible sur les produits en couronne ℤ$r$ ≀ $S$$n$ introduit par Adin, Brenti et Roichman (2012), sont des cas particuliers de cette construction. On conclura en expliquant brièvement comment ce travail peut-être utilisé pour définir des fonction quasi-symétriques, en insistant sur l’exemple de l’ordre faible sur $A$$n-1$ où l’on obtient les séries de Stanley classiques.

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A Quasisymmetric Function Generalization of the Chromatic Symmetric Function

The Electronic Journal of Combinatorics ◽

10.37236/518 ◽

2011 ◽

Vol 18 (1) ◽

Cited By ~ 6

Author(s):

Brandon Humpert

Keyword(s):

Symmetric Function ◽

Chromatic Polynomial ◽

Quasisymmetric Function ◽

Quasisymmetric Functions ◽

Acyclic Orientations ◽

Chromatic Symmetric Function

The chromatic symmetric function $X_G$ of a graph $G$ was introduced by Stanley. In this paper we introduce a quasisymmetric generalization $X^k_G$ called the $k$-chromatic quasisymmetric function of $G$ and show that it is positive in the fundamental basis for the quasisymmetric functions. Following the specialization of $X_G$ to $\chi_G(\lambda)$, the chromatic polynomial, we also define a generalization $\chi^k_G(\lambda)$ and show that evaluations of this polynomial for negative values generalize a theorem of Stanley relating acyclic orientations to the chromatic polynomial.

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