Persistence Exponent for the Simple Diffusion Equation: The Exact Solution for any Integer Dimension

Abstract

The persistence exponent θo for the simple diffusion equation φt( x,t) = φ (x,t) , with random Gaussian initial condition red, has been calculated exactly using a method known as selective averaging. The probability that the value of the field φ at a specified spatial coordinate remains positive throughout for a certain time t behaves as t-θo for asymptotically large time t. The value of θo, calculated here for any integer dimension d, is θo = d4 for d≤ 4 and 1 otherwise. This exact theoretical result is being reported possibly for the first time and is not in agreement with the accepted values θo = 0.12, 0.18,0.23 for d=1,2,3 respectively.