Identity Testing For Constant-width, And Any-order, Read-once Oblivious Arithmetic Branching Programs

Gurjar, Rohit ; Korwar, Arpita ; Saxena, Nitin (2017) Identity Testing For Constant-width, And Any-order, Read-once Oblivious Arithmetic Branching Programs Theory of Computing, 13 (1). pp. 1-21. ISSN 1557-2862

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Official URL: http://doi.org/10.4086/toc.2017.v013a002

Related URL: http://dx.doi.org/10.4086/toc.2017.v013a002

Abstract

We give improved hitting sets for two special cases of Read-once Oblivious Arithmetic Branching Programs (ROABP). First is the case of an ROABP with known order of the variables. The best previously known hitting set for this case had size (nw)O(logn) where n is the number of variables and w is the width of the ROABP. Even for a constant-width ROABP, nothing better than a quasi-polynomial bound was known. We improve the hitting-set size for the known-order case to nO(logw). In particular, this gives the first polynomial-size hitting set for constant-width ROABP (known-order). However, our hitting set only works when the characteristic of the field is zero or large enough. To construct the hitting set, we use the concept of the rank of the partial derivative matrix. Unlike previous approaches which build up from mapping variables to monomials, we map variables to polynomials directly.

Item Type:Article
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ID Code:122739
Deposited On:12 Aug 2021 11:59
Last Modified:12 Aug 2021 11:59

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