Solving Local Linear Systems with Boundary Conditions Using Heat Kernel Pagerank

Q3 Mathematics Internet Mathematics Pub Date : 2015-01-28 DOI:10.1080/15427951.2015.1009522
F. Graham, O. Simpson
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引用次数: 9

Abstract

We present an efficient algorithm for solving local linear systems with a boundary condition using the Green’s function of a connected induced subgraph related to the system. We introduce the method of using the Dirichlet heat kernel pagerank1 vector to approximate local solutions to linear systems in the graph Laplacian, satisfying given boundary conditions over a particular subset of vertices. With an efficient algorithm for approximating Dirichlet heat kernel pagerank, our Local Linear Solver algorithm computes an approximate local solution with multiplicative and additive error ε by performing O(ε−5s3log (s3ε−1)log n) random walk steps, where n is the number of vertices in the full graph, and s is the size of the local system on the induced subgraph.
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用热核Pagerank求解具有边界条件的局部线性系统
利用与该系统相关的连通诱导子图的格林函数,给出了求解具有边界条件的局部线性系统的有效算法。我们介绍了使用Dirichlet热核pagerank1向量来近似图拉普拉斯线性系统的局部解的方法,在特定的顶点子集上满足给定的边界条件。我们的局部线性解算器算法是一种有效的近似Dirichlet热核pagerank的算法,通过执行O(ε−5s3log (s3ε−1)log n)个随机漫步步来计算一个近似的局部解,其乘性和可加性误差为ε,其中n为完整图中的顶点数,s为诱导子图上局部系统的大小。
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Internet Mathematics
Internet Mathematics Mathematics-Applied Mathematics
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