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Double phase elliptic inclusions with convection and logarithmic perturbed terms

Shengda Zeng, Yasi Lu, Nikolaos S. Papageorgiou

2025Bulletin of Mathematical Sciences5 citationsDOIOpen Access PDF

Abstract

This paper deals with a new double phase elliptic inclusion (DPEI) formulated by a double phase partial differential operator with logarithmic perturbation, a general multivalued convection term defined in the domain and a general multivalued term defined in the boundary. First, we utilize a surjectivity theorem for pseudomonotone operators to verify the existence of weak solutions to DPEI under a coercive assumption. Then, in nocoercive setting, we establish the existence and compactness results of DPEI by applying the sub-supersolution method along with the non-smooth calculus analysis and truncation techniques. Moreover, the existence of extremal solutions follows if the constraint set K satisfies a certain lattice condition. Finally, we consider some special cases of DPEI and show the existence as well as extremality results of these special cases by constructing proper sub- and supersolutions.

Topics & Concepts

LogarithmPhase (matter)ConvectionMathematicsMathematical analysisPhysicsMechanicsQuantum mechanicsDifferential Equations and Numerical MethodsAdvanced Mathematical Modeling in EngineeringContact Mechanics and Variational Inequalities