The Experts below are selected from a list of 285 Experts worldwide ranked by ideXlab platform
Takayuki Oda - One of the best experts on this subject based on the ideXlab platform.
-
Matrix Coefficients of the Middle Discrete Series of SU(2, 2)☆
Journal of Functional Analysis, 2001Co-Authors: Takahiro Hayata, Harutaka Koseki, Takayuki OdaAbstract:Abstract An explicit formula for the Radial Part of matrix coefficients of the discrete series of Gel'fand–Kirillov dimension 5 of the special unitary group SU (2, 2) of index (2+, 2−), is obtained in terms of Gaussian hypergeometric functions plus some formulae of binomial coefficients.
-
Whittaker functions for the large discrete series representations of SU (2,1) and related zeta integrals
Publications of the Research Institute for Mathematical Sciences, 1995Co-Authors: Harutaka Koseki, Takayuki OdaAbstract:In terms of classical Bessel function, we represent explicitly the Radial Part of Whittaker functions on S£7(2,1) belonging to the large discrete series representations. Moreover we compute archimedean local L-factors corresponding to a construction of L-function by Gelbart and Piatetski-Shapiro.
Harutaka Koseki - One of the best experts on this subject based on the ideXlab platform.
-
Matrix Coefficients of the Middle Discrete Series of SU(2, 2)☆
Journal of Functional Analysis, 2001Co-Authors: Takahiro Hayata, Harutaka Koseki, Takayuki OdaAbstract:Abstract An explicit formula for the Radial Part of matrix coefficients of the discrete series of Gel'fand–Kirillov dimension 5 of the special unitary group SU (2, 2) of index (2+, 2−), is obtained in terms of Gaussian hypergeometric functions plus some formulae of binomial coefficients.
-
Whittaker functions for the large discrete series representations of SU (2,1) and related zeta integrals
Publications of the Research Institute for Mathematical Sciences, 1995Co-Authors: Harutaka Koseki, Takayuki OdaAbstract:In terms of classical Bessel function, we represent explicitly the Radial Part of Whittaker functions on S£7(2,1) belonging to the large discrete series representations. Moreover we compute archimedean local L-factors corresponding to a construction of L-function by Gelbart and Piatetski-Shapiro.
Ramazan Sever - One of the best experts on this subject based on the ideXlab platform.
-
Approximate l-state solutions to the Klein-Gordon equation for modified Woods-Saxon potential with position dependent mass
International Journal of Modern Physics A, 2009Co-Authors: Altug Arda, Ramazan SeverAbstract:The Radial Part of the Klein–Gordon equation for the generalized Woods–Saxon potential is solved by using the Nikiforov–Uvarov method with spatially dependent mass within the new approximation scheme to the centrifugal potential term. The energy eigenvalues and corresponding normalized eigenfunctions are computed. The solutions in the case of constant mass are also obtained to check out the consistency of our new approximation scheme.
-
Approximate l-State Solutions of the Klein-Gordon Equation for Modified Woods-Saxon Potential With Position Dependent Mass
arXiv: Quantum Physics, 2009Co-Authors: Altug Arda, Ramazan SeverAbstract:The Radial Part of the Klein-Gordon equation for the generalized Woods-Saxon potential is solved by using the Nikiforov-Uvarov method in the case of spatially dependent mass within the new approximation scheme to the centrifugal potential term. The energy eigenvalues and corresponding normalized eigenfunctions are computed. The solutions in the case of constant mass are also studied to check out the consistency of our new approximation scheme.
-
approximate solution of the effective mass klein gordon equation for the hulthen potential with any angular momentum
arXiv: Quantum Physics, 2008Co-Authors: Altug Arda, Ramazan SeverAbstract:The Radial Part of the effective mass Klein-Gordon equation for the Hulthen potential is solved by making an approximation to the centrifugal potential. The Nikiforov-Uvarov method is used in the calculations. Energy spectra and the corresponding eigenfunctions are computed. Results are also given for the case of constant mass.
Xue Yun-hao - One of the best experts on this subject based on the ideXlab platform.
-
Clinical features and treatment of Dupuytren's disease on Radial Part of the hand
Chinese Journal of Hand Surgery, 2004Co-Authors: Xue Yun-haoAbstract:Objective To explore the clinical features and clinical outcome of Dupuytren's disease on the Radial Part of the hand. Methods Eight cases of Dupuytren's disease on the Radial Part of the hand were studied retrospectively. All of them were located on the first web space and thenar eminence region, demonstrating tangled skin, nods and cords. Range of motion of the thumb was slightly impacted. The local strip of palmar aponeurosis was excised. Seven cases were followed up with an average of 25.1 months. One case was lost in follow-up.Results The contracture of the palmar aponeurosis in the Radial Part of the hand often occurred in combination with that in the ulnar side. The general results were satisfactory. Only 1 case recurred. The interphalangeal joint was seldom involved. Pathological results revealed that the excised tissue was contracture of palmar aponeurosis. Conclusion The typical locations of Dupuytren's disease on the Radial Part are the first metarcarpophalangeal joint at the palmar side, the thenar eminence at the ulnar side, the first web space and the thenar eminence at the Radial side. The interphalangeal joint is rarely affected. Good results can be achieved after aponeurectomy.
Takahiro Hayata - One of the best experts on this subject based on the ideXlab platform.
-
Matrix Coefficients of the Middle Discrete Series of SU(2, 2)☆
Journal of Functional Analysis, 2001Co-Authors: Takahiro Hayata, Harutaka Koseki, Takayuki OdaAbstract:Abstract An explicit formula for the Radial Part of matrix coefficients of the discrete series of Gel'fand–Kirillov dimension 5 of the special unitary group SU (2, 2) of index (2+, 2−), is obtained in terms of Gaussian hypergeometric functions plus some formulae of binomial coefficients.