Results 201 to 210 of about 3,636 (229)
Diagonalizing Bose Gases in the Gross-Pitaevskii Regime and Beyond. [PDF]
Commun Math PhysBrooks M.
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Turbulence generation supported by an inverse energy transfer through a zig-zag pattern. [PDF]
Sci RepKronborg J, Hoffman J.
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Para-Markov chains and related non-local equations. [PDF]
Fract Calc Appl AnalFacciaroni L +3 more
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Probability in the Engineering and Informational Sciences, 1989
We define two new classes of multistate coherent systems by requiring, among other conditions, that their structure functions be Schur-concave (Schurconvex). The M + 1 performance levels of both the systems and their components are represented by the set [0, 1,…, M]. We present basic structural properties of the new classes.
Abouammah, A. M. +2 more
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We define two new classes of multistate coherent systems by requiring, among other conditions, that their structure functions be Schur-concave (Schurconvex). The M + 1 performance levels of both the systems and their components are represented by the set [0, 1,…, M]. We present basic structural properties of the new classes.
Abouammah, A. M. +2 more
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Skew row-strict quasisymmetric Schur functions
Journal of Algebraic Combinatorics, 2015 Mason and Remmel introduced a basis for quasisymmetric functions known as the row-strict quasisymmetric Schur functions. This basis is generated combinatorially by fillings of composition diagrams that are analogous to the row-strict tableaux that ...
Elizabeth Niese
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Journal of Algorithms, 1984
The authors discuss a combinatorial rule for expanding the product of Schur functions as a sum of Schur functions. They claim it to be new, but it is in fact \textit{H. O. Foulkes}' ``line of route'' method [cf. Discrete Math. 15, 235--252 (1976; Zbl 0338.05002)].
Jeffrey B. Remmel, Roger Whitney
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The authors discuss a combinatorial rule for expanding the product of Schur functions as a sum of Schur functions. They claim it to be new, but it is in fact \textit{H. O. Foulkes}' ``line of route'' method [cf. Discrete Math. 15, 235--252 (1976; Zbl 0338.05002)].
Jeffrey B. Remmel, Roger Whitney
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Israel Journal of Mathematics, 1992
Schur functions play an essential role in the representation theory of symmetric groups [see e.g. \textit{I. G. Macdonald}, Symmetric functions and Hall polynomials (Oxford, 1979; Zbl 0487.20007)]. In this article, the author extends the Vandermonde determinant and then generalizes the classical presentation of Schur functions as quotients of such ...
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Schur functions play an essential role in the representation theory of symmetric groups [see e.g. \textit{I. G. Macdonald}, Symmetric functions and Hall polynomials (Oxford, 1979; Zbl 0487.20007)]. In this article, the author extends the Vandermonde determinant and then generalizes the classical presentation of Schur functions as quotients of such ...
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On the product of a Schur function and a skew Schur function
Journal of Statistical Planning and Inference, 1993zbMATH Open Web Interface contents unavailable due to conflicting licenses.
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GENERATING FUNCTION FOR SCHUR POLYNOMIALS
Bukovinian Mathematical Journal, 2022For the generating function $$ G_n(\mathbi{x},\mathbi{t})=\sum_{\lambda} \mathbi{s}_{\lambda}(x_1,x_2,\ldots, x_n) t_1^{\lambda_1 } t_2^{\lambda_2 } \cdots t_n^{\lambda_n}, $$ where the Sсhur polynomials $\mathbi{s}_{\lambda}(x_1,x_2,\ldots, x_n) $ are indexed by partitions $ \lambda $ of length no more than $ n $ the explicit form for $ n = 2,3 $ is ...
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