Dipartimento di Matematica
Universita di Torino
Via Carlo Alberto 10 - 10123
Torino, Italy
email: berchio@dm.unito.it
Dipartimento di Matematica del Politecnico
Piazza L. da Vinci 32 - 20133
Milano, Italy
email: gazzola@mate.polimi.it
Elvise Berchio, Filippo Gazzola
Abstract:
We study the existence of positive solutions for a fourth order
semilinear elliptic equation under Navier boundary conditions
with positive, increasing and convex source term. Both bounded
and unbounded solutions are considered.
When compared with second order equations, several differences
and difficulties arise. In order to overcome these difficulties
new ideas are needed. But still, in some cases we are able to extend
only partially the well-known results for second order equations.
The theoretical and numerical study of radial solutions in the ball
also reveal some new phenomena, not available for second order
equations. These phenomena suggest a number of intriguing unsolved
problems, which we quote in the final section.
Submitted October 10, 2004. Published March 23, 2005.
Math Subject Classifications: 35J40, 35J60, 35G30.
Key Words: Semilinear biharmonic equations; minimal solutions;
extremal solutions.
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Elvise Berchio Dipartimento di Matematica Universita di Torino Via Carlo Alberto 10 - 10123 Torino, Italy email: berchio@dm.unito.it |
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Filippo Gazzola Dipartimento di Matematica del Politecnico Piazza L. da Vinci 32 - 20133 Milano, Italy email: gazzola@mate.polimi.it |
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