On an explicit representation of central (2k+1)-nomial coefficients
classification
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coefficientsnomialcentralexplicitrepresentationapproachbooleancirculant
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We propose an explicit representation of central $(2k+1)$-nomial coefficients in terms of finite sums over trigonometric constructs. The approach utilizes the diagonalization of circulant boolean matrices and is generalizable to all $(2k+1)$-nomial coefficients, thus yielding a new family of combinatorical identities.
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