About DML-CZ | FAQ | News | Conditions of Use | Math Archives | Contact Us
  Previous |  Up |  Next

Article

First Page Preview
Bonafede, Salvatore
A weak maximum principle and estimates of ${\rm ess}\sup\sb \Omega u$ for nonlinear degenerate elliptic equations. (English). Czechoslovak Mathematical Journal, vol. 46 (1996), issue 2, pp. 259-269
MSC: 35B50, 35J65, 35J70 | MR 1388615 | Zbl 0870.35042
References:
[1] R. Adams: Sobolev Spaces. Academic Press, 1975. MR 0450957 | Zbl 0314.46030
[2] S. Bonafede: On maximum principle for weak subsolutions of degenerate parabolic linear equations. Comm. Math. Univ. Carolinae 35 (1994), no. 3, 417–430. MR 1307270 | Zbl 0808.35065
[3] F. Cooper: A maximum principle for degenerate elliptic equations. J. London Math. Soc. 2 (1973), no. 6, 205–209. MR 0318671 | Zbl 0257.35041
[4] G. Fichera: On a unified theory of boundary value problems for elliptic-parabolic equations of second order, In: Boundary value problems in differential equations. University of Wisconsin Press. Madison (1960), 97–120. MR 0111931
[5] D. Gilberg, N. Trudinger: Elliptic Partial Differential Equations of Second Order. Springer Verlag, 1983. MR 0737190
[6] F. Guglielmino, F. Nicolosi: Sulle $W$-soluzioni dei problemi al contorno per operatori ellittici degeneri. Ricerche di Matematica Supp XXXVI (1987), 59–72. MR 0956018
[7] O. A. Ladyzhenskaya, N. N. Ural’tseva: Linear and Quasilinear Elliptic Equations. Academic Press, New York, 1968. MR 0244627
[8] M. K. V. Murthy, G. Stampacchia: Boundary value problems for some degenerate-elliptic operators. Annali di Matematica 4 (1968), no. 80, 1–122. MR 0249828
[9] F. Nicolosi: Sottosoluzioni deboli delle equazioni paraboliche lineari del secondo ordine superiormente limitate. Le Matematiche 28 (1973), 361–378. MR 0364867
[10] F. Nicolosi: Regolarizzazione delle soluzioni deboli dei problemi al contorno per operatori parabolici degeneri. Le Matematiche 33 (1978), 83–98. Zbl 0454.35023
[11] F. Nicolosi: Soluzioni deboli dei problemi al contorno per operatori parabolici che possono degenerare. Annali di Matematica 4 (1980), no. 125, 135–155. MR 1553443 | Zbl 0452.35065
[12] G. Stampacchia: Le probleme de Dirichlet pour les equations elliptiques du second ordre, a coefficients discontinus. Annali Inst. Fourier 15 (1965), 189–257. MR 0192177 | Zbl 0151.15401
[13] J. Serrin: Local behavior of solution of quasilinear equations. Acta Mathematica 111 (1964), 247–302. MR 0170096
Partner of
EuDML logo