Space-Fractional Diffusion with Variable Order and Diffusivity:Discretization and Direct Solution Strategies  

作　　者：Hasnaa Alzahrani George Turkiyyah Omar Knio David Keyes 

机构地区：[1]King Abdullah University of Science and Technology,Thuwal,Saudi Arabia

出　　处：《Communications on Applied Mathematics and Computation》2022年第4期1416-1440,共25页应用数学与计算数学学报（英文）

基　　金：support of the Extreme Computing Research Center at KAUST.

摘　　要：We consider the multidimensional space-fractional diffusion equations with spatially varying diffusivity and fractional order.Significant computational challenges are encoun-tered when solving these equations due to the kernel singularity in the fractional integral operator and the resulting dense discretized operators,which quickly become prohibitively expensive to handle because of their memory and arithmetic complexities.In this work,we present a singularity-aware discretization scheme that regularizes the singular integrals through a singularity subtraction technique adapted to the spatial variability of diffusiv-ity and fractional order.This regularization strategy is conveniently formulated as a sparse matrix correction that is added to the dense operator,and is applicable to different formula-tions of fractional diffusion equations.We also present a block low rank representation to handle the dense matrix representations,by exploiting the ability to approximate blocks of the resulting formally dense matrix by low rank factorizations.A Cholesky factorization solver operates directly on this representation using the low rank blocks as its atomic com-putational tiles,and achieves high performance on multicore hardware.Numerical results show that the singularity treatment is robust,substantially reduces discretization errors,and attains the first-order convergence rate allowed by the regularity of the solutions.They also show that considerable savings are obtained in storage(O(N^(1.5)))and computational cost(O(N^(2)))compared to dense factorizations.This translates to orders-of-magnitude savings in memory and time on multidimensional problems,and shows that the proposed methods offer practical tools for tackling large nonlocal fractional diffusion simulations.

关 键 词：Fractional diffusion Variable order Variable diffusivity Singularity subtraction Block low rank matrix Tile low rank(TLR)Cholesky 

分 类 号：O17[理学—数学]