Harmonic Analysis on the Heisenberg Group

1 The Group Fourier Transform.- 1.1 The Heisenberg group.- 1.2 The Schrödinger representations.- 1.3 The Fourier and Weyl transforms.- 1.4 Hermite and special Hermite functions.- 1.5 Paley—Wiener theorems for the Fourier transform.- 1.6 An uncertainty principle on the Heisenberg group.- 1.7 Notes and references.- 2 Analysis of the Sublaplacian.- 2.1 Spectral theory of the sublaplacian.- 2.2 Spectral decomposition for Lp functions.- 2.3 Restriction theorems for the spectral projections.- 2.4 A Paley-Wiener theorem for the spectral projections.- 2.5 Bochner-Riesz means for the sublaplacian.- 2.6 A multiplier theorem for the Fourier transform.- 2.7 Notes and references.- 3 Group Algebras and Applications.- 3.1 The Heisenberg motion group.- 3.2 Gelfand pairs, spherical functions and group algebras.- 3.3 An algebra of radial measures.- 3.4 Analogues of Wiener-Tauberian theorem.- 3.5 Spherical means on the Heisenberg group.- 3.6 A maximal theorem for spherical means.- 3.7 Notes and references.- 4 The Reduced Heisenberg Group.- 4.1 The reduced Heisenberg group.- 4.2 A Wiener-Tauberian theorem for Lp functions.- 4.3 A maximal theorem for spherical means.- 4.4 Mean periodic functions on phase space.- 4.5 Notes and references.