Ebook: Representation of Lie Groups and Special Functions: Volume 2: Class I Representations, Special Functions, and Integral Transforms
- Tags: Special Functions, Abstract Harmonic Analysis, Topological Groups Lie Groups, Theoretical Mathematical and Computational Physics, Integral Transforms Operational Calculus
- Series: Mathematics and Its Applications 74
- Year: 1993
- Publisher: Springer Netherlands
- Edition: 1
- Language: English
- pdf
This is the second of three major volumes which present a comprehensive treatment of the theory of the main classes of special functions from the point of view of the theory of group representations.
This volume deals with the properties of special functions and orthogonal polynomials (Legendre, Gegenbauer, Jacobi, Laguerre, Bessel and others) which are related to the class 1 representations of various groups. The tree method for the construction of bases for representation spaces is given. `Continuous' bases in the spaces of functions on hyperboloids and cones and corresponding Poisson kernels are found. Also considered are the properties of the q-analogs of classical orthogonal polynomials, related to representations of the Chevalley groups and of special functions connected with fields of p-adic numbers. Much of the material included appears in book form for the first time and many of the topics are presented in a novel way.
This volume will be of great interest to specialists in group representations, special functions, differential equations with partial derivatives and harmonic anlysis.
Subscribers to the complete set of three volumes will be entitled to a discount of 15%.
This is the second of three major volumes which present a comprehensive treatment of the theory of the main classes of special functions from the point of view of the theory of group representations.
This volume deals with the properties of special functions and orthogonal polynomials (Legendre, Gegenbauer, Jacobi, Laguerre, Bessel and others) which are related to the class 1 representations of various groups. The tree method for the construction of bases for representation spaces is given. `Continuous' bases in the spaces of functions on hyperboloids and cones and corresponding Poisson kernels are found. Also considered are the properties of the q-analogs of classical orthogonal polynomials, related to representations of the Chevalley groups and of special functions connected with fields of p-adic numbers. Much of the material included appears in book form for the first time and many of the topics are presented in a novel way.
This volume will be of great interest to specialists in group representations, special functions, differential equations with partial derivatives and harmonic anlysis.
Subscribers to the complete set of three volumes will be entitled to a discount of 15%.
Content:
Front Matter....Pages i-xviii
Special Functions Connected with SO(n) and with Related Groups....Pages 1-158
Representations of Groups, Related to SO(n?1), in Non-Canonical Bases, Special Functions, and Integral Transforms....Pages 159-277
Special Functions Connected with the Groups U(n), U(n?1,1) and IU(n?1)....Pages 278-409
Representations of the Heisenberg Group and Special Functions....Pages 410-484
Representations of Discrete Groups and Special Functions of Discrete Argument....Pages 485-576
Back Matter....Pages 577-612
This is the second of three major volumes which present a comprehensive treatment of the theory of the main classes of special functions from the point of view of the theory of group representations.
This volume deals with the properties of special functions and orthogonal polynomials (Legendre, Gegenbauer, Jacobi, Laguerre, Bessel and others) which are related to the class 1 representations of various groups. The tree method for the construction of bases for representation spaces is given. `Continuous' bases in the spaces of functions on hyperboloids and cones and corresponding Poisson kernels are found. Also considered are the properties of the q-analogs of classical orthogonal polynomials, related to representations of the Chevalley groups and of special functions connected with fields of p-adic numbers. Much of the material included appears in book form for the first time and many of the topics are presented in a novel way.
This volume will be of great interest to specialists in group representations, special functions, differential equations with partial derivatives and harmonic anlysis.
Subscribers to the complete set of three volumes will be entitled to a discount of 15%.
Content:
Front Matter....Pages i-xviii
Special Functions Connected with SO(n) and with Related Groups....Pages 1-158
Representations of Groups, Related to SO(n?1), in Non-Canonical Bases, Special Functions, and Integral Transforms....Pages 159-277
Special Functions Connected with the Groups U(n), U(n?1,1) and IU(n?1)....Pages 278-409
Representations of the Heisenberg Group and Special Functions....Pages 410-484
Representations of Discrete Groups and Special Functions of Discrete Argument....Pages 485-576
Back Matter....Pages 577-612
....
This volume deals with the properties of special functions and orthogonal polynomials (Legendre, Gegenbauer, Jacobi, Laguerre, Bessel and others) which are related to the class 1 representations of various groups. The tree method for the construction of bases for representation spaces is given. `Continuous' bases in the spaces of functions on hyperboloids and cones and corresponding Poisson kernels are found. Also considered are the properties of the q-analogs of classical orthogonal polynomials, related to representations of the Chevalley groups and of special functions connected with fields of p-adic numbers. Much of the material included appears in book form for the first time and many of the topics are presented in a novel way.
This volume will be of great interest to specialists in group representations, special functions, differential equations with partial derivatives and harmonic anlysis.
Subscribers to the complete set of three volumes will be entitled to a discount of 15%.
This is the second of three major volumes which present a comprehensive treatment of the theory of the main classes of special functions from the point of view of the theory of group representations.
This volume deals with the properties of special functions and orthogonal polynomials (Legendre, Gegenbauer, Jacobi, Laguerre, Bessel and others) which are related to the class 1 representations of various groups. The tree method for the construction of bases for representation spaces is given. `Continuous' bases in the spaces of functions on hyperboloids and cones and corresponding Poisson kernels are found. Also considered are the properties of the q-analogs of classical orthogonal polynomials, related to representations of the Chevalley groups and of special functions connected with fields of p-adic numbers. Much of the material included appears in book form for the first time and many of the topics are presented in a novel way.
This volume will be of great interest to specialists in group representations, special functions, differential equations with partial derivatives and harmonic anlysis.
Subscribers to the complete set of three volumes will be entitled to a discount of 15%.
Content:
Front Matter....Pages i-xviii
Special Functions Connected with SO(n) and with Related Groups....Pages 1-158
Representations of Groups, Related to SO(n?1), in Non-Canonical Bases, Special Functions, and Integral Transforms....Pages 159-277
Special Functions Connected with the Groups U(n), U(n?1,1) and IU(n?1)....Pages 278-409
Representations of the Heisenberg Group and Special Functions....Pages 410-484
Representations of Discrete Groups and Special Functions of Discrete Argument....Pages 485-576
Back Matter....Pages 577-612
This is the second of three major volumes which present a comprehensive treatment of the theory of the main classes of special functions from the point of view of the theory of group representations.
This volume deals with the properties of special functions and orthogonal polynomials (Legendre, Gegenbauer, Jacobi, Laguerre, Bessel and others) which are related to the class 1 representations of various groups. The tree method for the construction of bases for representation spaces is given. `Continuous' bases in the spaces of functions on hyperboloids and cones and corresponding Poisson kernels are found. Also considered are the properties of the q-analogs of classical orthogonal polynomials, related to representations of the Chevalley groups and of special functions connected with fields of p-adic numbers. Much of the material included appears in book form for the first time and many of the topics are presented in a novel way.
This volume will be of great interest to specialists in group representations, special functions, differential equations with partial derivatives and harmonic anlysis.
Subscribers to the complete set of three volumes will be entitled to a discount of 15%.
Content:
Front Matter....Pages i-xviii
Special Functions Connected with SO(n) and with Related Groups....Pages 1-158
Representations of Groups, Related to SO(n?1), in Non-Canonical Bases, Special Functions, and Integral Transforms....Pages 159-277
Special Functions Connected with the Groups U(n), U(n?1,1) and IU(n?1)....Pages 278-409
Representations of the Heisenberg Group and Special Functions....Pages 410-484
Representations of Discrete Groups and Special Functions of Discrete Argument....Pages 485-576
Back Matter....Pages 577-612
....
Download the book Representation of Lie Groups and Special Functions: Volume 2: Class I Representations, Special Functions, and Integral Transforms for free or read online
Continue reading on any device:
Last viewed books
Related books
{related-news}
Comments (0)