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Higher order evolution inequalities with nonlinear convolution terms

Roberta Filippucci, Marius Ghergu

2022Nonlinear Analysis16 citationsDOIOpen Access PDF

Abstract

We are concerned with the study of existence and nonexistence of weak solutions to ∂ku∂tk+(−Δ)mu≥(K∗|u|p)|u|qinRN×R+,∂iu∂ti(x,0)=ui(x)inRN,0≤i≤k−1, where N,k,m≥1 are positive integers, p,q>0 and ui∈Lloc1(RN) for 0≤i≤k−1. We assume that K is a radial positive and continuous function which decreases in a neighbourhood of infinity. In the above problem, K∗|u|p denotes the standard convolution operation between K(|x|) and |u|p. We obtain necessary conditions on N,m,k,p and q such that the above problem has solutions. Our analysis emphasizes the role played by the sign of ∂k−1u∂tk−1.

Topics & Concepts

Neighbourhood (mathematics)MathematicsOrder (exchange)Convolution (computer science)CombinatoricsInfinityFunction (biology)Nonlinear systemPhysicsPure mathematicsMathematical analysisQuantum mechanicsComputer scienceArtificial neural networkMachine learningFinanceEconomicsBiologyEvolutionary biologyNonlinear Partial Differential EquationsNonlinear Differential Equations AnalysisStability and Controllability of Differential Equations
Higher order evolution inequalities with nonlinear convolution terms | Litcius