## Progress in partial differential equations: elliptic and parabolic problems. Proceedings of the first European conference on elliptic and parabolic problems held in Pont-à-Mousson, France, June 1991.(English)Zbl 0782.00049

Pitman Research Notes in Mathematics Series. 266. Harlow: Longman Scientific & Technical. New York: Wiley. vii, 289 p. (1992).
The articles of this volume will be reviewed individually.
Indexed articles:
Díaz, J. I., Symmetrization of nonlinear elliptic and parabolic problems and applications: A particular overview, 1-16 [Zbl 0804.35032]
Friedman, A., Elliptic and parabolic systems associated with semiconductor modeling, 17-23 [Zbl 0819.35136]
Hess, P., On the asymptotically periodic Fisher equation, 24-33 [Zbl 0821.35076]
Knightly, G. H.; Sather, D., Time-periodic states in problems containing a structure parameter, 34-42 [Zbl 0831.35129]
Levine, H. A., Fujita type theorems for weakly coupled parabolic systems, 43-55 [Zbl 0823.35076]
Pokhozhaev, S., On entire solutions of semilinear elliptic equations, 56-69 [Zbl 0821.35046]
Rodrigues, J. F., Strong solutions for quasi-linear elliptic-parbolic problems with time- dependent obstacles, 70-82 [Zbl 0821.35157]
Talenti, G.; Tonani, F., Detecting subsurface gas sources, 83-91 [Zbl 0820.35079]
Abakhti-Mchachti, A.; Fleckinger-Pellé, J., Existence of positive solutions for non cooperative semilinear elliptic system defined on an unbounded domain, 92-106 [Zbl 0820.35046]
Alabau, F., A decoupling method for proving uniqueness theorems for electro-diffusion equations, 107-119 [Zbl 0794.34005]
Carl, S., An existence result for discontinuous elliptic equations under discontinuous nonlinear flux conditions, 120-130 [Zbl 0822.35047]
Barceló-Conesa, M., A remark on quadratic growth of solutions for a class of fully nonlinear second order PDEs, 131-141 [Zbl 0819.35004]
Ferone, V.; Posteraro, M. Rosaria, Symmetrization for a class of nonlinear elliptic equations, 142-148 [Zbl 0826.35005]
Abergel, F.; Hilhorst, D.; Issard-Roch, F., On a Stefan problem with surface tension in the neighborhood of a stationary solution, 149-155 [Zbl 0925.35163]
Kawohl, B., On a class of singular elliptic equations, 156-163 [Zbl 0821.35053]
Kenmochi, N.; Koyama, T.; Visintin, A., On a class of variational inequalities with memory terms, 164-175 [Zbl 0821.35087]
Kutev, N., Global solvability and boundary gradient blow up for one dimensional parabolic equations, 176-181 [Zbl 0819.35080]
Liang, J., Weakly-coercive quasilinear elliptic equations with inhomogeneous measure data, 182-192 [Zbl 0821.35045]
Lieberman, G. M., Existence of solutions to the first initial-boundary value problem for parabolic equations via elliptic regularization, 193-206 [Zbl 0828.35051]
Lohéac, J.-P., Artificial boundary conditions for advection-diffusion equations, 207-219 [Zbl 0824.35043]
Pütter, R., Bounds for Neumann eigenvalues of $$n$$-dimensional balls and second eigenfunctions on ellipsoids, 220-231 [Zbl 0808.35084]
Ruf, B., Remarks on a superlinear Sturm-Liouville equation, 232-239 [Zbl 0804.34031]
Svanstedt, N.; Wyller, J., A numerical algorithm for the solution of the homogenized $$p$$-Poisson equation, 240-250 [Zbl 0796.65114]
Sweers, G., A sign-changing global minimizer on a convex domain, 251-258 [Zbl 0789.35066]
Vivaldi, M. A., Oscillation and energy decay of solutions to obstacle problems involving quasi-linear, degenerate-elliptic operators, 259-273 [Zbl 0820.35076]
von Below, J., An existence result for semilinear parabolic network equations with dynamical node conditions, 274-283 [Zbl 0826.35056]
Yin, Hong-Ming, Remarks on regularity of the interface in the heat equation with strong absorption, 284-289 [Zbl 0832.35078]

### MSC:

 00B25 Proceedings of conferences of miscellaneous specific interest 35-06 Proceedings, conferences, collections, etc. pertaining to partial differential equations