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Sparsified Cholesky and Multigrid Solvers for Connection Laplacians

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arxiv 1512.01892 v1 pith:UXEEGM4I submitted 2015-12-07 cs.DS

Sparsified Cholesky and Multigrid Solvers for Connection Laplacians

classification cs.DS
keywords linearalgorithmsconnectionequationsfactorizationlaplacianlaplacianssparsified
verification ladder T0 review T1 audit T2 compute T3 formal T4 reserved
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We introduce the sparsified Cholesky and sparsified multigrid algorithms for solving systems of linear equations. These algorithms accelerate Gaussian elimination by sparsifying the nonzero matrix entries created by the elimination process. We use these new algorithms to derive the first nearly linear time algorithms for solving systems of equations in connection Laplacians, a generalization of Laplacian matrices that arise in many problems in image and signal processing. We also prove that every connection Laplacian has a linear sized approximate inverse. This is an LU factorization with a linear number of nonzero entries that is a strong approximation of the original matrix. Using such a factorization one can solve systems of equations in a connection Laplacian in linear time. Such a factorization was unknown even for ordinary graph Laplacians.

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