We consider a compact, connected, orientable, boundaryless Riemannian manifold (M, g) of class C∞ where g denotes the metric tensor. Let n = dim M ≥ 3. Using Morse techniques, we prove the existence of $2{mathcal P}-1(M) -1$ nonconstant solutions u H1,p(M) to the quasilinear problem $$(P-epsilon) left{{egin{array}{@{}l@{}} -epsilon^p Delta-{p,g} u +u^{p-1}=u^{q-1}, \u>0,end{array}} ight$$ for ε > 0 small enough, where 2 ≤ p < n, p < q < p∗, p∗= np/(n - p) and $Delta-{p, g} u = extrm{div}-g (ert abla uert-{g}^{p-2} abla u)$ is the p-laplacian associated to g of u (note that Δ2,g = Δg) and ${mathcal P}-t(M)$ denotes the Poincaré polynomial of M. We also establish results of genericity of nondegenerate solutions for the quasilinear elliptic problem (Pε).
Multiplicity and nondegeneracy of positive solutions to quasilinear equations on compact Riemannian manifolds / Cingolani, S.; Vannella, G.; Visetti, D.. - In: COMMUNICATIONS IN CONTEMPORARY MATHEMATICS. - ISSN 0219-1997. - STAMPA. - 17:2(2015). [10.1142/S0219199714500291]
Multiplicity and nondegeneracy of positive solutions to quasilinear equations on compact Riemannian manifolds
Cingolani, S.
;Vannella, G.;
2015-01-01
Abstract
We consider a compact, connected, orientable, boundaryless Riemannian manifold (M, g) of class C∞ where g denotes the metric tensor. Let n = dim M ≥ 3. Using Morse techniques, we prove the existence of $2{mathcal P}-1(M) -1$ nonconstant solutions u H1,p(M) to the quasilinear problem $$(P-epsilon) left{{egin{array}{@{}l@{}} -epsilon^p Delta-{p,g} u +u^{p-1}=u^{q-1}, \u>0,end{array}} ight$$ for ε > 0 small enough, where 2 ≤ p < n, p < q < p∗, p∗= np/(n - p) and $Delta-{p, g} u = extrm{div}-g (ert abla uert-{g}^{p-2} abla u)$ is the p-laplacian associated to g of u (note that Δ2,g = Δg) and ${mathcal P}-t(M)$ denotes the Poincaré polynomial of M. We also establish results of genericity of nondegenerate solutions for the quasilinear elliptic problem (Pε).File | Dimensione | Formato | |
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