Positive Berezin liminf does not imply essential positivity for radial Toeplitz operators on Bergman and Fock spaces

Abstract

We study whether essential positivity \[ σess(Tf)⊂ [0,∞) \] of a radial Toeplitz operator on Bergman and Fock spaces can be detected from the asymptotic behavior of its Berezin transform. For bounded real-valued radial symbols on A2(D), Per\"al\"a and Virtanen conjectured that \[ |z| 1- f(z) 0 \] should be equivalent to essential positivity, and they asked the analogous question on Fock space. Such a criterion would turn a spectral question into a scalar asymptotic test. We prove that this fails even in the radial setting in which the conjecture was formulated. For every complex dimension d 1, we construct explicit bounded real-valued radial symbols on the Bergman spaces A2(Bd) and the Fock spaces F2(Cd) whose Berezin transform has strictly positive limit inferior at the boundary (respectively, at infinity), while the essential spectrum of the corresponding Toeplitz operator contains a negative point. In particular, this disproves the Per\"al\"a--Virtanen conjecture in its original one-dimensional Bergman form and answers the analogous Fock-space question negatively; more generally, the radial Berezin liminf criterion fails in all dimensions in both settings. The underlying reason is that, for radial symbols, the Toeplitz eigenvalue sequence and the Berezin transform are different asymptotic averages of the same oscillatory symbol, and these averages damp the oscillation by different amounts.

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