2026-05-31T00:07:39Zhttps://riuma.uma.es/rest/oai/requestoai:riuma.uma.es:10630/288002026-02-03T11:04:39Zcom_10630_2254col_10630_37953
Bergman projection on Lebesgue space Induced by doubling weight
Peláez-Márquez, José Ángel
De la Rosa, Elena
Rättyä, Jouni
Análisis matemático
Álgebra
Pesos y medidas
Medida - Teoría de la
Let ω and ν be radial weights on the unit disc of the complex
plane, and denote σ = ωp′
ν− p′
p and ωx = ∫ 1
0 sxω(s) ds for all 1 ≤ x < ∞.
Consider the one-weight inequality
‖Pω (f )‖Lp
ν ≤ C‖f ‖Lp
ν , 1 < p < ∞, (†)
for the Bergman projection Pω induced by ω. It is shown that the moment
condition
Dp(ω, ν) = sup
n∈N∪{0}
(νnp+1) 1
p (σnp′+1) 1
p′
ω2n+1
< ∞
is necessary for (†) to hold. Further, Dp(ω, ν) < ∞ is also sufficient for
(†) if ν admits the doubling properties sup0≤r<1
∫ 1
r ν(s)s ds
∫ 1
1+r
2
ν(s)s ds < ∞ and
sup0≤r<1
∫ 1
r ν(s)s ds
∫ 1− 1−r
K
r ν(s)s ds
< ∞ for some K > 1. In addition, an analogous
result for the one weight inequality ‖Pω (f )‖Dp
ν,k ≤ C‖f ‖Lp
ν , where
‖f ‖p
Dp
ν,k
=
k−1∑
j=0
|f (j)(0)|p +
∫
D
|f (k)(z)|p(1 − |z|)kpν(z) dA(z) < ∞, k ∈ N,
is established. The inequality (†) is further studied by using the necessary
condition Dp(ω, ν) < ∞ in the case of the exponential type weights ν(r) =
exp
(
− α
(1−rl)β
)
and ω(r) = exp
(
− ̃α
(1−r ̃l) ̃β
)
, where 0 < α, ̃α, l, ̃l < ∞
and 0 < β, ̃β ≤ 1
2024-01-17T08:11:26Z
2024-01-17T08:11:26Z
2024-01-17T08:11:26Z
2023-11-28
journal article
Peláez, J.Á., de la Rosa, E. & Rättyä, J. Bergman Projection on Lebesgue Space Induced by Doubling Weight. Results Math 79, 27 (2024). https://doi.org/10.1007/s00025-023-02048-5
https://hdl.handle.net/10630/28800
10.1007/s00025-023-02048-5
eng
http://creativecommons.org/licenses/by/4.0/
open access
Atribución 4.0 Internacional
Springer Nature