扭曲 Fock 空间上某些线性算子的有界性

IF 1 3区数学 Q1 MATHEMATICS

Mathematische Zeitschrift Pub Date : 2024-05-21 DOI:10.1007/s00209-024-03500-0

Rahul Garg, Sundaram Thangavelu

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引用次数: 0

摘要

在扭曲的福克空间（{\mathcal {F}}^\lambda ({\mathbb {C}}^{2n}) \）上，我们考虑两类卷积算子（\( S_\varphi \和\( {\widetilde{S}}_\varphi \^lambda）。和（{\widetilde{S}}_\varphi ^\lambda \）与{\mathcal {F}}^\lambda ({{\mathbb {C}}}^{2n}) 中的（\varphi \）元素相关联。\)我们在\( \varphi \)上找到一个必要且充分的条件，使得\( S_\varphi ^\lambda \)（respond.\( {\widetilde{S}}_\varphi ^\lambda \)）在\( {\mathcal {F}}^\lambda ({{\mathbb {C}}^{2n}).\) 上是有界的。）我们证明，对于任何给定的非常数 \( \varphi \)，这两个算子中至少有一个是无界的。

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Boundedness of certain linear operators on twisted Fock spaces

On the twisted Fock spaces \( {\mathcal {F}}^\lambda ({{\mathbb {C}}}^{2n}) \) we consider two types of convolution operators \( S_\varphi ^\lambda \) and \( {\widetilde{S}}_\varphi ^\lambda \) associated to an element \( \varphi \in {\mathcal {F}}^\lambda ({{\mathbb {C}}}^{2n}).\) We find a necessary and sufficient condition on \( \varphi \) so that \( S_\varphi ^\lambda \) (resp. \( {\widetilde{S}}_\varphi ^\lambda \) ) is bounded on \( {\mathcal {F}}^\lambda ({{\mathbb {C}}}^{2n}).\) We show that for any given non constant \( \varphi \) at least one of these two operators is unbounded.

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