Results 11 to 20 of about 244,094 (312)
Point-Symmetric Multivariate Density Function and Its Decomposition [PDF]
Journal of Probability and Statistics, 2014 For a T-variate density function, the present paper defines the point-symmetry, quasi-point-symmetry of order k (
Kiyotaka Iki, Sadao Tomizawa
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A Vertex-Weighted Tutte Symmetric Function, and Constructing Graphs with Equal Chromatic Symmetric Function [PDF]
, 2021 This paper has two main parts. First, we consider the Tutte symmetric function XB, a generalization of the chromatic symmetric function. We introduce a vertex-weighted version ofXB, show that this function admits a deletion-contraction relation, and ...
Spirkl, Sophie +3 more
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Scheduling Problems and Generalized Graph Coloring [PDF]
Discrete Mathematics & Theoretical Computer Science, 2020 We define a new type of vertex coloring which generalizes vertex coloring in graphs, hypergraphs, andsimplicial complexes. To this coloring there is an associated symmetric function in noncommuting variables for whichwe give a deletion-contraction ...
John Machacek
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Symplectic duality of Symmetric Spaces [PDF]
, 2008 We show that between symmetric spaces of different types there exists a bi-symplectic map.
Loi, Andrea +4 more
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Karpatsʹkì Matematičnì Publìkacìï, 2017 It is known that the so-called elementary symmetric polynomials $R_n(x) = \int_{[0,1]}(x(t))^n\,dt$ form an algebraic basis in the algebra of all symmetric continuous polynomials on the complex Banach space $L_\infty,$ which is dense in the Fr\'{e}chet ...
T.V. Vasylyshyn
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Quantum Symmetric Functions [PDF]
Communications in Algebra, 2005 We study quantum deformations of Poisson orbivarieties. Given a Poisson manifold $(\mathbb{R}^{m},α)$ we consider the Poisson orbivariety $(\mathbb{R}^{m})^{n}/S_{n}$. The Kontsevich star product on functions on $(\mathbb{R}^{m})^{n}$ induces a star product on functions on $(\mathbb{R}^{m})^{n}/S_{n}$.
Diaz, Rafael, Pariguan, Eddy
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On the Schur Function Expansion of a Symmetric Quasi-symmetric Function [PDF]
The Electronic Journal of Combinatorics, 2019 Egge, Loehr, and Warrington proved a formula for the Schur function expansion of a symmetric function in terms of its expansion in fundamental quasi-symmetric functions. Their formula involves the coefficients of a modified inverse Kostka matrix. Recently Garsia and Remmel gave a simpler reformulation of Egge, Loehr, and Warrington's result, with a new
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Karpatsʹkì Matematičnì Publìkacìï, 2018 It is known that every complex-valued homomorphism of the Fréchet algebra $H_{bs}(L_\infty)$ of all entire symmetric functions of bounded type on the complex Banach space $L_\infty$ is a point-evaluation functional $\delta_x$ (defined by $\delta_x(f) = f(
T.V. Vasylyshyn
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IEEE Transactions on Information Theory, 2005 We present an extensive study of symmetric Boolean functions, especially of their cryptographic properties. Our main result establishes the link between the periodicity of the simplified value vector of a symmetric Boolean function and its degree.
Canteaut, Anne, Videau, Marion
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ON INEQUALITIES OF HERMITE – HADAMARD TYPE INVOLVING AN s-CONVEX FUNCTION WITH APPLICATIONS
Проблемы анализа, 2016 Motivated by a recent paper, the author provides some new integral inequalities of Hermite–Hadamard type involving the product of an s-convex function and a symmetric function and applies these new established inequalities to construct inequalities for ...
Liu Zheng
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