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Existence and blow up of solutions for a strongly damped Petrovsky equation with variable-exponent nonlinearities

Antontsev Antontsev, Jorge Ferreira, Erhan Pışkın

2021Electronic Journal of Differential Equations27 citationsDOIOpen Access PDF

Abstract

In this article, we consider a nonlinear plate (or beam) Petrovsky equation with strong damping and source terms with variable exponents. By using the Banach contraction mapping principle we obtain local weak solutions, under suitable assumptions on the variable exponents p(.) and q(.). Then we show that the solution is global if \(p(.) \geq q(.)\). Also, we prove that a solution with negative initial energy and \(p(.)<q(.)\) blows up in finite time. For more information see https://ejde.math.txstate.edu/Volumes/2021/06/abstr.html

Topics & Concepts

MathematicsExponentNonlinear systemVariable (mathematics)Mathematical analysisEnergy (signal processing)Mathematical physicsPhysicsQuantum mechanicsStatisticsLinguisticsPhilosophyStability and Controllability of Differential EquationsAdvanced Mathematical Physics ProblemsAdvanced Mathematical Modeling in Engineering
Existence and blow up of solutions for a strongly damped Petrovsky equation with variable-exponent nonlinearities | Litcius