The double Gelfand-Cetlin system, invariance of polarization, and the Peter-Weyl theorem

Abstract

The bundle map T*-2ptU(n)U(n) provides a real polarization of the cotangent bundle T*-2ptU(n), and yields the geometric quantization Q1(T*-2ptU(n)) = L2(U(n)). We use the Gelfand-Cetlin systems of Guillemin and Sternberg to show that T*-2ptU(n) has a different real polarization with geometric quantization Q2(T*-2ptU(n))= α Vα Vα*, where the sum is over all dominant integral weights α of U(n). The Peter-Weyl theorem, which states that these two quantizations are isomorphic, may therefore be interpreted as an instance of ``invariance of polarization" in geometric quantization.