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Calderón–Zygmund estimates for the fully nonlinear obstacle problem with super-linear Hamiltonian terms and unbounded ingredients
In this work, we show the existence/uniqueness of L p -viscosity solutions for a fully non-linear obstacle problem with super-linear gradient growth, unbounded ingredients and irregular obstacles. In our results, we obtain Calderón–Zygmund estimates, namely W loc 2 , p regularity estimates (with p ∈...
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| Published in: | Mathematische Zeitschrift 2024-03, Vol.306 (3), Article 40 |
|---|---|
| Main Authors: | , |
| Format: | Article |
| Language: | English |
| Subjects: | |
| Citations: | Items that this one cites |
| Online Access: | Get full text |
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| Summary: | In this work, we show the existence/uniqueness of
L
p
-viscosity solutions for a fully non-linear obstacle problem with super-linear gradient growth, unbounded ingredients and irregular obstacles. In our results, we obtain Calderón–Zygmund estimates, namely
W
loc
2
,
p
regularity estimates (with
p
∈
n
2
,
∞
) for such solution. Our findings are newsworthy even for the simplest model case:
Δ
u
+
b
(
x
)
·
D
u
+
μ
(
x
)
‖
D
u
‖
m
=
f
(
x
)
in
{
u
>
φ
}
∩
Ω
u
(
x
)
=
g
(
x
)
on
∂
Ω
,
where
f
∈
L
p
(
Ω
)
,
φ
∈
W
2
,
p
(
Ω
)
if
m
=
1
, and
φ
∈
W
2
,
2
p
(
Ω
)
if
m
∈
(
1
,
2
]
, for
b
∈
L
ϱ
(
Ω
)
and
μ
∈
L
q
(
Ω
)
with
ϱ
,
q
>
n
, thereby extending recent Calderón–Zygmund estimates for the fully nonlinear obstacle problem with unbounded drift terms and irregular obstacles. Finally, in the unconstrained linear setting (i.e., without restriction on obstacle and
m
=
1
), we obtain
W
loc
2
,
p
regularity estimates for the range of integrability
p
∈
(
p
0
,
n
]
. These estimates may be of independent mathematical interest and complement the Sobolev estimates recently addressed when
p
>
n
.. |
|---|---|
| ISSN: | 0025-5874 1432-1823 |
| DOI: | 10.1007/s00209-024-03444-5 |