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Rosengren, Hjalmar - Department of Mathematics, Chalmers University of Technology
A NEW QUANTUM ALGEBRAIC INTERPRETATION OF THE ASKEY{WILSON POLYNOMIALS
MULTIVARIABLE ORTHOGONAL POLYNOMIALS AND COUPLING COEFFICIENTS FOR
MULTIVARIABLE qHAHN POLYNOMIALS AS COUPLING COEFFICIENTS FOR
MULTILINEAR HANKEL FORMS OF HIGHER ORDER AND ORTHOGONAL POLYNOMIALS
CURRICULUM VITAE (April 12, 2011)
A NON-COMMUTATIVE BINOMIAL FORMULA HJALMAR ROSENGREN
ON THE TRIPLE SUM FORMULA FOR WIGNER 9j-SYMBOLS
MULTIVARIABLE ORTHOGONAL POLYNOMIALS AND COUPLING COEFFICIENTS FOR
ON THE TRIPLE SUM FORMULA FOR WIGNER 9j-SYMBOLS
file: newHank (Draft 24/5 2000: iMAC.)
ANOTHER PROOF OF THE TRIPLE SUM FORMULA FOR WIGNER 9J-SYMBOLS
A NEW QUANTUM ALGEBRAIC INTERPRETATION OF THE ASKEY-WILSON POLYNOMIALS
ANOTHER PROOF OF THE TRIPLE SUM FORMULA FOR WIGNER 9J-SYMBOLS
A NON-COMMUTATIVE BINOMIAL FORMULA HJALMAR ROSENGREN
