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A global compactness result and multiplicity of solutions for a class of critical exponent problems in the hyperbolic space

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dc.contributor.author BHAKTA, MOUSOMI en_US
dc.contributor.author Ganguly, Debdip en_US
dc.contributor.author Gupta, Diksha en_US
dc.contributor.author SAHOO, ALOK KUMAR en_US
dc.date.accessioned 2024-10-18T05:21:17Z
dc.date.available 2024-10-18T05:21:17Z
dc.date.issued 2024-09 en_US
dc.identifier.citation Communications in Contemporary Mathematics en_US
dc.identifier.issn 0219-1997 en_US
dc.identifier.issn 1793-6683 en_US
dc.identifier.uri https://doi.org/10.1142/S0219199724500457 en_US
dc.identifier.uri http://dr.iiserpune.ac.in:8080/xmlui/handle/123456789/9123
dc.description.abstract This paper deals with the global compactness and multiplicity of positive solutions to problems of the type-Delta(N)(B) u-lambda u = a(x)|u|(2*-2)u + f(x) in B-N, u is an element of H-1(B-N),where B-N denotes the ball model of the hyperbolic space of dimension N >= 4, 2* = 2N/ N-2, N(N-2)/4 < lambda < (N-1)(2)/4 and f is an element of H-1(B-N) ( f not equivalent to 0 ) is a non-negative functional in the dual space of H-1(B-N). The potential a is an element of L-infinity(B-N) is assumed to be strictly positive, such that lim(d(x,0)->infinity) a(x)=1, where d(x,0) denotes the geodesic distance. We establish profile decomposition of the associated functional. We show that concentration takes place along two different profiles, namely along hyperbolic bubbles and localized Aubin-Talenti bubbles. For f=0 and a equivalent to 1, profile decomposition was studied by Bhakta and Sandeep [Calc. Var. PDE, 2012]. However, due to the presence of a(.), an extension of profile decomposition to the present set-up is highly nontrivial and requires several delicate estimates and geometric arguments concerning the isometry group (Mobius group) of the hyperbolic space. Further, using the decomposition result, we derive various energy estimates involving the interacting hyperbolic bubbles and hyperbolic bubbles with localized Aubin-Talenti bubbles. Finally, combining these estimates with topological and variational arguments, we establish a multiplicity of positive solutions in the cases: a >= 1 and a<1 separately. The equation studied in this article can be thought of as a variant of a scalar-field equation with a critical exponent in the hyperbolic space, although such a critical exponent problem in the Euclidean space RN has only a trivial solution when f equivalent to 0, a(x)equivalent to 1 and lambda<0. en_US
dc.language.iso en en_US
dc.publisher World Scientific Publishing Co Pte Ltd en_US
dc.subject Hyperbolic space en_US
dc.subject Critical exponent en_US
dc.subject Profile decomposition en_US
dc.subject Energy estimates en_US
dc.subject Interaction between bubbles en_US
dc.subject Hyperbolic bubble en_US
dc.subject Localized Aubin-Talenti bubble en_US
dc.subject Multiplicity en_US
dc.subject 2024 en_US
dc.subject 2024-OCT-WEEK3 en_US
dc.subject TOC-OCT-2024 en_US
dc.title A global compactness result and multiplicity of solutions for a class of critical exponent problems in the hyperbolic space en_US
dc.type Article en_US
dc.contributor.department Dept. of Mathematics en_US
dc.identifier.sourcetitle Communications in Contemporary Mathematics en_US
dc.publication.originofpublisher Foreign en_US


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