Cianchi, Andrea:
Optimal integrability of the Jacobian of orientation preserving maps
Bollettino dell'Unione Matematica Italiana Serie 8 2-B (1999), fasc. n.3, p. 619-628, Unione Matematica Italiana (English)
pdf (229 Kb), djvu (140 Kb). | MR1719554 | Zbl 0937.46037
Sunto
Dato un qualsiasi spazio invariante per riordinamenti $X(\Omega)$ su un insieme aperto $\Omega\subset \mathbb{R}^{n}$, si determina il più piccolo spazio invariante per riordinamenti $Y (\Omega)$ con la proprietà che se $u:\Omega \to \mathbb{R}^{n}$ è una applicazione che mantiene l'orientamento e $|Du|^{n} \in X(\Omega)$, allora $\det Du$ appartiene localmente a $Y(\Omega)$.
Referenze Bibliografiche
[AM]
M. A.
ARIÑO
-
B.
MUCKENHOUPT
,
Maximal functions on classical Lorentz spaces and Hardy's inequality with weights for nonincreasing functions,
Trans. Amer. Math. Soc.,
320 (
1990), 727-735. |
MR 989570 |
Zbl 0716.42016[BP]
R. J.
BAGBY
-
J. D.
PARSONS
,
Orlicz spaces and rearranged maximal functions,
Math. Nachr.,
132 (
1987), 15-27. |
MR 910041 |
Zbl 0662.46031[BS]
C.
BENNETT
-
R.
SHARPLEY
,
Interpolation of Operators,
Academic Press, Boston (
1988). |
MR 928802 |
Zbl 0647.46057[BFS]
H.
BREZIS
-
N.
FUSCO
-
C.
SBORDONE
,
Integrability for the Jacobian of orientation preserving mappings,
J. Funct. Anal.,
115 (
1993), 425-431. |
MR 1234399 |
Zbl 0847.26012[BF]
P. L.
BUTZER
-
F.
FEHÉR
,
Generalized Hardy and Hardy-Littlewood inequalities in rearrangement-invariant spaces,
Comment. Math. Prace Mat., Tomus Specialis in Honorum Ladislai Orlicz (
1978), 41-64. |
MR 504152 |
Zbl 0385.26013[CGS]
M. J.
CARRO
-
A.
GARCÍA DEL AMO
-
J.
SORIA
,
Weak-type weights and normable Lorentz spaces,
Proc. Amer. Math. Soc.,
124 (
1996), 849-857. |
MR 1307501 |
Zbl 0853.42016[G]
L.
GRECO
, Sharp results on integrability of the Jacobian, preprint Univ. Napoli.
[GIM]
L.
GRECO
-
T.
IWANIEC
-
G.
MOSCARIELLO
,
Limits of the improved integrability of volume forms,
Indiana Univ. Math. J.,
44 (
1995), 305-339. |
MR 1355401 |
Zbl 0855.42009[IS]
T.
IWANIEC
-
C.
SBORDONE
,
On the integrability of the Jacobian under minimal hypotheses,
Arch. Rat. Mech. Anal.,
119 (
1992), 129-143. |
MR 1176362 |
Zbl 0766.46016[K1]
H.
KITA
,
On maximal functions in Orlicz spaces,
Proc. Amer. Math. Soc.,
124 (
1996), 3019-3025. |
MR 1376993 |
Zbl 0862.42014[L]
G. G.
LORENTZ
,
Relations between function spaces,
Proc. Amer. Math. Soc.,
12 (
1961), 127-132. |
MR 123182 |
Zbl 0124.31704[Mi]
M.
MILMAN
,
Inequalities for Jacobians: interpolation techniques,
Rev. Colombiana Mat.,
27 (
1993), 67-81. |
MR 1252243 |
Zbl 0830.46024[Mos]
G.
MOSCARIELLO
,
On the integrability of the Jacobian in Orlicz spaces,
Math. Japonica,
40 (
1992), 323-329. |
MR 1297249 |
Zbl 0805.46026[Mü]
S.
MÜLLER
,
Higher integrability of determinants and weak convergence in $L^{1}$,
J. reine angew. Math.,
412 (
1990), 20-34. |
MR 1078998 |
Zbl 0713.49004
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