Periodic space-time homogenisation of the φ42 equation
Abstract
We consider the homogenisation problem for the φ42 equation on the torus T2, namely the behaviour as 0 of the solutions to the equation suggestively written as ∂t u - ∇· A(x/,t/2) ∇ u = -u3 + where denotes space-time white noise and A: T2× R is uniformly elliptic, periodic and H\"older continuous. When the noise is regularised at scale δ 1 we show that any joint limit ,δ 0 recovers the classical dynamical φ42 model. In certain regimes or if the regularisation is chosen in a specific way adapted to the problem, we show that the counterterms can be chosen as explicit local functions of A.
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