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A priori bounds for rough differential equations with a non-linear damping term

Timothée Bonnefoi, Ajay Chandra, Augustin Moinat, Hendrik Weber

2022Journal of Differential Equations11 citationsDOIOpen Access PDF

Abstract

We consider a rough differential equation with a non-linear damping drift term:dY(t)=−|Y|m−1Y(t)dt+σ(Y(t))dX(t), where m>1, X is a (branched) rough path of arbitrary regularity α>0, and where σ is smooth and satisfies an m and α-dependent growth property. We show a strong a priori bound for Y, which includes the “coming down from infinity” property, i.e. the bound on Y(t) for a fixed t>0 holds uniformly over all choices of initial datum Y(0). The method of proof builds on recent work on a priori bounds for the ϕ4 SPDE in arbitrary subcritical dimension [7]. A key new ingredient is an extension of the algebraic framework which permits to derive an estimate on higher order conditions of a coherent controlled rough path in terms of the regularity condition at lowest level.

Topics & Concepts

MathematicsA priori and a posterioriTerm (time)Algebraic numberA priori estimateGeodetic datumDimension (graph theory)Differential equationMathematical analysisExtension (predicate logic)InfinityPath (computing)Order (exchange)Compact spacePure mathematicsCartographyProgramming languageEpistemologyQuantum mechanicsFinancePhysicsEconomicsComputer scienceGeographyPhilosophyAdvanced Mathematical Modeling in EngineeringAdvanced Numerical Methods in Computational MathematicsStochastic processes and financial applications