Harmonic analysis and representation theory for groups acting on homogeneous trees /
Figà-Talamanca, Alessandro, 1938-
Harmonic analysis and representation theory for groups acting on homogeneous trees / Harmonic Analysis & Representation Theory for Groups Acting on Homogenous Trees Alessandro Figà-Talamanca and Claudio Nebbia. - Cambridge : Cambridge University Press, 1991. - 1 online resource (ix, 151 pages) : digital, PDF file(s). - London Mathematical Society lecture note series ; 162 . - London Mathematical Society lecture note series ; 162. .
Title from publisher's bibliographic system (viewed on 05 Oct 2015).
These notes treat in full detail the theory of representations of the group of automorphisms of a homogeneous tree. The unitary irreducible representations are classified in three types: a continuous series of spherical representations; two special representations; and a countable series of cuspidal representations as defined by G.I. Ol'shiankii. Several notable subgroups of the full automorphism group are also considered. The theory of spherical functions as eigenvalues of a Laplace (or Hecke) operator on the tree is used to introduce spherical representations and their restrictions to discrete subgroups. This will be an excellent companion for all researchers into harmonic analysis or representation theory.
9780511662324 (ebook)
Automorphisms.
Harmonic analysis.
Representations of groups.
QA166.2 / .F43 1991
515.2433
Harmonic analysis and representation theory for groups acting on homogeneous trees / Harmonic Analysis & Representation Theory for Groups Acting on Homogenous Trees Alessandro Figà-Talamanca and Claudio Nebbia. - Cambridge : Cambridge University Press, 1991. - 1 online resource (ix, 151 pages) : digital, PDF file(s). - London Mathematical Society lecture note series ; 162 . - London Mathematical Society lecture note series ; 162. .
Title from publisher's bibliographic system (viewed on 05 Oct 2015).
These notes treat in full detail the theory of representations of the group of automorphisms of a homogeneous tree. The unitary irreducible representations are classified in three types: a continuous series of spherical representations; two special representations; and a countable series of cuspidal representations as defined by G.I. Ol'shiankii. Several notable subgroups of the full automorphism group are also considered. The theory of spherical functions as eigenvalues of a Laplace (or Hecke) operator on the tree is used to introduce spherical representations and their restrictions to discrete subgroups. This will be an excellent companion for all researchers into harmonic analysis or representation theory.
9780511662324 (ebook)
Automorphisms.
Harmonic analysis.
Representations of groups.
QA166.2 / .F43 1991
515.2433