Quantitative homogenization on time-dependent random conductance models with stable-like jumps
Abstract
We establish quantitative homogenization results for time-dependent random conductance models with stable-like long range jumps on d, where the transition probability from x to y is given by wt, x,y|x-y|-d-α with α∈ (0,2). In particular, time-dependent random coefficients \wt,x,y: t∈ +, (x,y)∈ E\ are uniformly bounded from above (but may be degenerate), and satisfy the Kolmogorov continuous condition, where E=\(x, y): x = y ∈ d\ is the set of all unordered pairs on d. The proofs are based on L2-estimates and energy estimates for solutions to regionalparabolic equations and multi-scale Poincar\'e inequalities associated with time-dependent symmetric stable-like random walks with random coefficients.
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