TY - JOUR
T1 - Two problems on random analytic functions in Fock spaces
AU - Fang, Xiang
AU - Tien, Pham Trong
N1 - Publisher Copyright:
© The Author(s), 2022. Published by Cambridge University Press on behalf of The Canadian Mathematical Society.
PY - 2023/8/8
Y1 - 2023/8/8
N2 - Let (Formula Presented) be an entire function on the complex plane, and let (Formula Presented) be its randomization induced by a standard sequence of independent Bernoulli, Steinhaus, or Gaussian random variables. In this paper, we characterize those functions such that is almost surely in the Fock space for any. Then such a characterization, together with embedding theorems which are of independent interests, is used to obtain a Littlewood-type theorem, also known as regularity improvement under randomization within the scale of Fock spaces. Other results obtained in this paper include: (a) a characterization of random analytic functions in the mixed-norm space, an endpoint version of Fock spaces, via entropy integrals; (b) a complete description of random lacunary elements in Fock spaces; and (c) a complete description of random multipliers between different Fock spaces.
AB - Let (Formula Presented) be an entire function on the complex plane, and let (Formula Presented) be its randomization induced by a standard sequence of independent Bernoulli, Steinhaus, or Gaussian random variables. In this paper, we characterize those functions such that is almost surely in the Fock space for any. Then such a characterization, together with embedding theorems which are of independent interests, is used to obtain a Littlewood-type theorem, also known as regularity improvement under randomization within the scale of Fock spaces. Other results obtained in this paper include: (a) a characterization of random analytic functions in the mixed-norm space, an endpoint version of Fock spaces, via entropy integrals; (b) a complete description of random lacunary elements in Fock spaces; and (c) a complete description of random multipliers between different Fock spaces.
KW - Fock spaces
KW - Random analytic functions
KW - mixed norm space
UR - http://www.scopus.com/inward/record.url?scp=85134051757&partnerID=8YFLogxK
U2 - 10.4153/S0008414X22000372
DO - 10.4153/S0008414X22000372
M3 - 期刊論文
AN - SCOPUS:85134051757
SN - 0008-414X
VL - 75
SP - 1176
EP - 1198
JO - Canadian Journal of Mathematics
JF - Canadian Journal of Mathematics
IS - 4
ER -