Localization and Toeplitz Operators on Polyanalytic Fock Spaces

Abstract

The well know conjecture of Coburn [ L.A. Coburn, On the Berezin-Toeplitz calculus, Proc. Amer. Math. Soc. 129 (2001) 3331-3338.] proved by Lo [ M-L. Lo, The Bargmann Transform and Windowed Fourier Transform, Integr. equ. oper. theory, 27 (2007), 397-412.] and Englis [ M. Englis, Toeplitz Operators and Localization Operators, Trans. Am. Math Society 361 (2009) 1039-1052.] states that any Gabor-Daubechies operator with window and symbol a(x,ω) quantized on the phase space by a Berezin-Toeplitz operator with window and symbol σ(z,z) coincides with a Toeplitz operator with symbol Dσ(z,z) for some polynomial differential operator D. Using the Berezin quantization approach, we will extend the proof for polyanalytic Fock spaces. While the generation is almost mimetic for two-windowed localization operators, the Gabor analysis framework for vector-valued windows will provide a meaningful generalization of this conjecture for true polyanalytic Fock spaces and moreover for polyanalytic Fock spaces. Further extensions of this conjecture to certain classes of Gel'fand-Shilov spaces will also be considered a-posteriori.