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Center manifolds for rough partial differential equations

Christian Kuehn, Alexandra Neamţu

2023Electronic Journal of Probability13 citationsDOIOpen Access PDF

Abstract

We prove a center manifold theorem for rough partial differential equations (rough PDEs). The class of rough PDEs we consider contains as a key subclass reaction-diffusion equations driven by nonlinear multiplicative noise, where the stochastic forcing is given by a γ-Hölder rough path, for γ∈(1∕3,1∕2]. Our proof technique relies upon the theory of rough paths and analytic semigroups in combination with a discretized Lyapunov-Perron-type method in a suitable scale of interpolation spaces. The resulting center manifold is a random manifold in the sense of the theory of random dynamical systems (RDS). We also illustrate our main theorem for reaction-diffusion equations as well as for the Swift-Hohenberg equation.

Topics & Concepts

MathematicsCenter manifoldPartial differential equationMathematical analysisStochastic partial differential equationManifold (fluid mechanics)Nonlinear systemPure mathematicsEngineeringPhysicsHopf bifurcationQuantum mechanicsBifurcationMechanical engineeringStability and Controllability of Differential EquationsAdvanced Mathematical Modeling in EngineeringStochastic processes and financial applications
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