We study Toeplitz operators on fractional parabolic Hardy spaces associated with fundamental solutions of fractional heat operators. For a finite positive Borel measure on the upper half-space, we first recall the characterization of boundedness and compactness of Toeplitz operators in terms of Carleson measures. The main purpose of this paper is to investigate the stability of Toeplitz operators with respect to variations of the fractional parameter (0, 1]. Assuming that satisfies a uniform Carleson condition on a compact interval of parameters, we prove that the corresponding family of Toeplitz operators depends continuously on in the operator norm topology. Moreover, this stability property gives rise to a normal family structure of the operator family T_^{ () }_, which may be regarded as an operator-theoretic analogue of the classical Montel–Vitali theorem in complex analysis. As immediate consequences, boundedness and compactness are shown to be stable under perturbations of the fractional parameter. This is a revised and extended version of an earlier preprint on stability of Toeplitz operators.
Shuhei Kuwahara (Sat,) studied this question.
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