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Schur convexity and Schur multiplicative convexity for a class of symmetric functions with applications

Authors:

Institution:

(1) Division of Mathematical Sciences, School of Physical and Mathematical Sciences, Nanyang Technological University, 637371 Singapore, Singapore

Abstract:

For x = (x ₁, x ₂, …, x _n) ∈ (0, 1 ]ⁿ and r ∈ { 1, 2, … , n}, a symmetric function F _n (x, r) is defined by the relation

F_n( x,r ) = F_n( x₁,x₂, ?, x_n;r ) = ?_{1 \leqslant₁ < i₂ ?i_r \leqslant n} ?_{j = 1}^r \frac1 - x_{i_j}x_{i_j} , {F_n}\left( {x,r} \right) = {F_n}\left( {{x_1},{x_2}, \ldots, {x_n};r} \right) = \sum\limits_{1{ \leqslant_1} < {i_2} \ldots {i_r} \leqslant n} {\prod\limits_{j = 1}^r {\frac{{1 - {x_{{i_j}}}}}{{{x_{{i_j}}}}}} },

Keywords:
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