| Front for the arXiv | |||
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| Articles by M.Schlosser |
Articles 1 to 26 of 26
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arXiv:0803.2329 A Taylor expansion theorem for an elliptic extension of the Askey-Wilson operator. Michael J. Schlosser. math.CA (math.CO). |
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arXiv:0712.2125 On an identity by Chaundy and Bullard. I. Tom H. Koornwinder, Michael J. Schlosser. math.CA. |
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arXiv:0709.2012 Simulation of LiCAS Error Propagation. G. Grzelak, A. Reichold, J. Dale, M. Dawson, J. Green, Y. Han, M. Jones, G. Moss, B. Ottewell, R. Wastie, D. Kämptner, J. Prenting, M. Schlösser. physics.ins-det (physics.acc-ph). |
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math/0611639 Macdonald Polynomials and Multivariable Basic Hypergeometric Series. Michael J. Schlosser. SIGMA 3 (2007), 056, 30 pages. math.CO (math.CA math.QA physics.math-ph). |
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math.CA/0608742 Multilateral inversion of A_r, C_r and D_r basic hypergeometric series. Michael J. Schlosser. math.CA (math.CO). |
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math.CA/0608026 Curious extensions of Ramanujan's 1-psi-1 summation formula. Victor J. W. Guo, Michael J. Schlosser. ESI Preprint No. 1822. math.CA. |
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math.CA/0607122 A new multivariable 6-psi-6 summation formula. Michael Schlosser. math.CA. |
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math.CO/0602260 Elliptic enumeration of nonintersecting lattice paths. Michael Schlosser. math.CO (math.CA). |
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math.CA/0505215 Summation, transformation, and expansion formulas for multibasic theta hypergeometric series. George Gasper, Michael Schlosser. Adv. Stud. Contemp. Math. (Kyungshang) 11 (2005), no. 1, 67-84. math.CA. |
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math.CA/0505213 Elliptic determinant evaluations and the Macdonald identities for affine root systems. Hjalmar Rosengren, Michael Schlosser. Compositio Math. 142 (2006), 937-961. math.CA (math.CO). |
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math.CA/0412080 Noncommutative extensions of Ramanujan's 1-psi-1 summation. Michael Schlosser. Electron. Trans. Numer. Anal. 24 (2006), 94-102. math.CA (math.QA). |
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math.CA/0411136 Summation formulae for noncommutative hypergeometric series. Michael Schlosser. math.CA (math.QA). |
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math.CA/0403481 Some curious q-series expansions and beta integral evaluations. George Gasper, Michael Schlosser. math.CA. |
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math.CO/0402127 Inversion of the Pieri formula for Macdonald polynomials. Michel Lassalle, Michael Schlosser. Adv. Math. 202 (2) (2006), 289-325. math.CO (math.AC). |
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math.CA/0312236 Another proof of Bailey's 6-psi-6 summation. Frederic Jouhet, Michael Schlosser. Aequationes Math. 70 (1-2) (2005), 43-50. math.CA (math.CO). |
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math.CA/0309358 On Warnaar's elliptic matrix inversion and Karlsson-Minton-type elliptic hypergeometric series. Hjalmar Rosengren, Michael Schlosser. J. Comput. Appl. Math. 178 (2005), 377-391. math.CA (math.CO math.QA). |
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math.CO/0307315 An analytic formula for Macdonald polynomials. Michel Lassalle, Michael Schlosser. C. R. Math. Acad. Sci. Paris 337 (9) (2003), 569-574. math.CO (math.QA). |
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math.CA/0304249 Summations and transformations for multiple basic and elliptic hypergeometric series by determinant evaluations. Hjalmar Rosengren, Michael Schlosser. Indag. Math. (N.S.) 14 (2003), 483-514. math.CA (math.CO math.QA). |
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math.CO/0302270 Abel-Rothe type generalizations of Jacobi's triple product identity. Michael J. Schlosser. Dev. Math. 13 (2005), 383-400. math.CO (math.CA). |
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math.CA/0211151 A nonterminating 8-phi-7 summation for the root system C_r. Michael J. Schlosser. J. Comput. Appl. Math. 160 (2003), 283-296. math.CA (math.QA). |
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math.CA/0206032 Inversion of bilateral basic hypergeometric series. Michael Schlosser. Electron. J. Combin. 10 (2003), #R10, 27 pp.. math.CA (math.CO). |
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math.CA/0103024 A multidimensional generalization of Shukla's 8-psi-8 summation. Michael Schlosser (The Ohio State University). Constr. Approx. 19 (2003), 163-178. math.CA (math.CO math.QA). |
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math.CA/0102174 Multilateral transformations of q-series with quotients of parameters that are nonnegative integer powers of q. Michael Schlosser. Contemp. Math. 291 (2001), 203-227. math.CA (math.CO math.QA). |
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math.CA/0010162 A new A_n extension of Ramanujan's 1-psi-1 summation with applications to multilateral A_n series. S. C. Milne (The Ohio State University), M. Schlosser (The Ohio State University). math.CA (math.CO math.QA). |
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math.CA/0010161 Elementary derivations of identities for bilateral basic hypergeometric series. M. Schlosser (The Ohio State University). math.CA (math.CO math.QA). |
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math.CA/0007046 A simple proof of Bailey's very-well-poised 6-psi-6 summation. M. Schlosser (The Ohio State University). math.CA (math.CO math.QA). |
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