The Origin and Mathematical Characteristics of the Super-Universal Associated-Legendre Polynomials 被引量：1

The Origin and Mathematical Characteristics of the Super-Universal Associated-Legendre Polynomials

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摘要 We study the mathematical characteristics of the super-universal associated-Legendre polynomials arising from a kind of double ring-shaped potentials and obtain their polar angular wave functions with certain parity. We find that there exists the even or odd parity for the polar angular wave functions when the parameter η is taken to be positive integer, while there exist both even and odd parities when η is taken as positive non-integer real values. The relations among the super-universal associated-Legendre polynomials, the hypergeometric polynomials, and the Jacobi polynomials are also established. We study the mathematical characteristics of the super-universal associated-Legendre polynomials arising from a kind of double ring-shaped potentials and obtain their polar angular wave functions with certain parity. We find that there exists the even or odd parity for the polar angular wave functions when the parameter η is taken to be positive integer, while there exist both even and odd parities when η is taken as positive non-integer real values. The relations among the super-universal associated-Legendre polynomials, the hypergeometric polynomials, and the Jacobi polynomials are also established.

作者陈昌远尤源陆法林孙东升董世海

机构地区 School of Physics and Electronics Escuela Superior de Físicay Matemáticas Department of Physics and Astronomy

出处《Communications in Theoretical Physics》 SCIE CAS CSCD 2014年第9期331-337,共7页 理论物理通讯（英文版）

基金 Supported by the National Natural Science Foundation of China under Grant No.11275165 partly by 20140772-SIP-IPN,Mexico

关键词 double ring-shaped potential super-universal ASSOCIATED LEGENDRE POLYNOMIALS parity HYPERGEOMETRIC functions JACOBI POLYNOMIALS double ring-shaped potential super-universal associated Legendre polynomials parity hypergeometric functions Jacobi polynomials

分类号 O174.14 [理学—基础数学]

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2014年第9期

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