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LARGE SOLUTIONS OF ELLIPTIC SYSTEMS OF SECOND ORDER AND APPLICATIONS TO THE BIHARMONIC EQUATION
(AMER INST MATHEMATICAL SCIENCES, 2012)
In this work we study the nonnegative solutions of the elliptic system
On characterization bertrand mate of timelike biharmonic curves in the lorentzian Heis3
(SABER-ULAVenezuela, 2011)
Some existence results of bounded variation solutions to 1-biharmonic problems
(2018-07-15)
In this paper we establish some existence results to a fourth-order quasilinear elliptic equation involving the 1-biharmonic operator, formally given by Δ1 2u=Δ([Formula presented]). We consider different geometrical ...
Multiplicity of solutions for a biharmonic equation with subcritical or critical growth
(Belgian Mathematical Soc Triomphe, 2014)
On a quasilinear elliptic problem involving the 1-biharmonic operator and a Strauss type compactness result
(2020-01-01)
In this paper we prove the compactness of the embeddings of the space of radially symmetric functions of BL(R N) into some Lebesgue spaces. In order to do so we prove a regularity result for solutions of the Poisson equation ...
Singularly perturbed biharmonic problems with superlinear nonlinearities
(Khayyam Publ Co Inc, 2014-01-01)
We are interested in finding a family of solutions of a singularly perturbed biharmonic equation, which has a concentration behavior. The proof is based on variational methods and uses a weak version of the Ambrosetti-Rabinowitz ...
Singularly perturbed biharmonic problems with superlinear nonlinearities
(2014-01-01)
We are interested in finding a family of solutions of a singularly perturbed biharmonic equation, which has a concentration behavior. The proof is based on variational methods and uses a weak version of the Ambrosetti-Rabinowitz ...
A fourth-order equation with critical growth: the effect of the domain topology
(Juliusz Schauder Centre for Nonlinear StudiesTorun, 2015)
In this paper we prove the existence of multiple classical solutions for the fourth-order problem [...] where is a smooth bounded domain in 'R POT. N', N '> OU =' 8, '2 IND. *' = 2N/(N - 4) and ''mü' IND. 1' is the first ...