Litcius/Paper detail

Phase Reduction of Waves, Patterns, and Oscillations Subject to Spatially Extended Noise

James MacLaurin

2023SIAM Journal on Applied Mathematics13 citationsDOI

Abstract

.In this paper we present a framework in which one can rigorously study the effect of spatio-temporal noise on traveling waves, stationary patterns, and oscillations that are invariant under the action of a finite-dimensional set of continuous isometries (such as translation or rotation). This formalism can accommodate patterns, waves, and oscillations in reaction-diffusion systems and neural field equations. To do this, we define the phase by precisely projecting the infinite-dimensional system onto the manifold of isometries. We outline a precise stochastic differential equation for the phase. The phase is then used to show that the probability of the system leaving the attracting basin of the manifold after an exponentially long period of time (in \(\epsilon^{-2}\), the magnitude of the noise) is exponentially unlikely.Keywordsphase reductiontraveling wavespattern formationSPDEstochasticMSC codes60G9935A18

Topics & Concepts

Invariant manifoldMathematicsInvariant (physics)Mathematical analysisManifold (fluid mechanics)Exponential growthFormalism (music)Statistical physicsPhysicsMathematical physicsEngineeringMechanical engineeringMusicalVisual artsArtstochastic dynamics and bifurcationNonlinear Dynamics and Pattern FormationNeural dynamics and brain function