Trombetti, C.:
On a class of Monge-Ampère type equations with lower order terms
Bollettino dell'Unione Matematica Italiana Serie 8 8-B (2005), fasc. n.3, p. 629-637, Unione Matematica Italiana (English)
pdf (234 Kb), djvu (116 Kb). | MR2182420 | Zbl 1117.35027
Sunto
Si dimostrano risultati di confronto per soluzioni di equazioni tipo Monge-Ampère in dimensione due, considerando anche il caso delle autofunzioni.
Referenze Bibliografiche
[1]
A. ALVINO -
V. FERONE -
G. TROMBETTI,
On properties of some nonlinear eigenvalues,
SIAM J. Math. Anal.,
29, no. 2 (
1998), 437-451. |
MR 1616519 |
Zbl 0908.35094[2]
I. J. BAKELMAN,
Convex Analysis and nonlinear geometric elliptic equations,
Springer-Verlag,
1994. |
MR 1305147 |
Zbl 0815.35001[3]
M. BELLONI -
B. KAWOHL,
A direct uniqueness proof for equations involving the p-Laplace operator,
Manuscripta Math.,
109 (2) (
2002), 229-231. |
MR 1935031 |
Zbl 1100.35032[4]
B. BRANDOLINI -
C. TROMBETTI,
A symmetrization result for Monge-Ampère type equations, Preprint
2003. |
MR 2308477 |
Zbl 1189.35141[5]
B. BRANDOLINI -
C. TROMBETTI,
Comparison results for Hessian equations via symmetrization, in preparation. |
Zbl 1215.35067[6]
L. BOCCARDO -
P. DRABEK -
D. GIACHETTI -
M. KUCERA,
Generalization of Fredholm alternative for nonlinear differential operators,
Nonlinear Analysis. T.M.A.,
10 (10) (
1986), 1083-1103. |
MR 857742 |
Zbl 0623.34031[7]
H. BREZIS -
L. OSWALD,
Remarks on sublinear elliptic equations,
Nonlinear Analysis T.M.A.,
10 (1) (
1986), 55-64. |
MR 820658 |
Zbl 0593.35045[8]
L. A. CAFFARELLI -
L. NIREMBERG -
SPRUCK J.,
The Dirichlet problem for nonlinear second-order elliptic equations,
Comm. Pure Appl. Math.,
37 (
1984), 369-402. |
MR 739925 |
Zbl 0598.35047[9]
S. Y. CHENG -
S. T. YAU,
On the regularity of Monge-Ampère equation $\det\left(\frac{\partial^2 u}{\partial x_i \partial x_j}\right) = F(x, u)$,
Comm. Pure Appl. Math.,
30 (
1977), 41-68. |
MR 437805 |
Zbl 0347.35019[10]
K. M. CHONG -
N. M. RICE,
Equimeasurable rearrangements of functions,
Queen's paper in pure and applied mathematics, n. 28. |
Zbl 0275.46024[11]
J. I. DIAZ -
J. E. SAA,
Existence et unicité de solutions positives pour certaines équations elliptiques quasilinéaires,
C. R. Acad. Sci. Paris,
305, Série I (
1987), 521-524. |
MR 916325 |
Zbl 0656.35039[12]
V. FERONE -
B. MESSANO,
A symmetrization result for nonlinear elliptic equations, to appear on
Revista Mat. Complutense. |
MR 2083955 |
Zbl 1097.35049[13]
D. GILBARG -
N. S. TRUDINGER,
Elliptic partial differential equations of second order,
Springer-Verlag,
1983. |
MR 737190 |
Zbl 0562.35001[14]
B. KAWOHL,
Rearrangements and convexity of the level sets in PDE,
Springer-Verlag, Berlin (
1985). |
MR 810619 |
Zbl 0593.35002[15]
N. D. KUTEV,
Nontrivial solutions for the equations of Monge-Ampere type,
J. Math. Anal. Appl.,
132 (
1988), 424-433. |
MR 943516 |
Zbl 0658.35035[16]
P. LINDQVIST,
On the equation $\mathrm{div}(|\nabla u|^{p-2} \nabla u)+\lambda |u|^{p-2} u = 0$,
Proceedings Amer. Math. Soc.,
109 (
1990), 157-164. |
MR 1007505 |
Zbl 0714.35029[17]
P. L. LIONS,
Sur les equations de Monge-Ampère,
Arch. Rat. Mech. Anal.,
89 (
1985), 93-122. |
MR 786541 |
Zbl 0579.35027[18]
P. L. LIONS,
Two remarks on Monge-Ampère equations,
Ann. Mat. Pura Appl.,
142 (
1985), 263-275. |
MR 839040 |
Zbl 0594.35023[20]
G. TALENTI,
Linear elliptic p.d.e.'s: level sets, rearrangements and a priori estimates of solutions,
Boll. UMI, (6)
4-B (
1985), 917-949. |
MR 831299 |
Zbl 0602.35025[21]
N. S. TRUDINGER,
On new isoperimetric inequalities and symmetrization,
J. Reine Angew. Math.,
488 (
1997), 203-220. |
MR 1465371 |
Zbl 0883.52006[22]
K. TSO,
On symmetrization and hessian equations,
J. Anal. Math.,
52 (
1989), 94-106. |
MR 981497 |
Zbl 0675.35040[24]
X. J. WANG,
Existence of multiple solutions to the equations of Monge-Ampère type,
J. Diff. Eq.,
100 (
1992), 95-118. |
MR 1187864 |
Zbl 0770.35019[25]
X. J. WANG,
A class of fully nonlinear equations and related functionals,
Indiana Univ. Math. J.,
43 (
1994), 25-54. |
MR 1275451 |
Zbl 0805.35036
Con il contributo del Ministero per i Beni e le Attività Culturali