Fast Context-Free Grammar Parsing Requires Fast Boolean Matrix Multiplication

Abstract

In 1975, Valiant showed that Boolean matrix multiplication can be used for parsing context-free grammars (CFGs), yielding the asympotically fastest (although not practical) CFG parsing algorithm known. We prove a dual result: any CFG parser with time complexity O(g n3 - ), where g is the size of the grammar and n is the length of the input string, can be efficiently converted into an algorithm to multiply m × m Boolean matrices in time O(m3 - ε/3). Given that practical, substantially sub-cubic Boolean matrix multiplication algorithms have been quite difficult to find, we thus explain why there has been little progress in developing practical, substantially sub-cubic general CFG parsers. In proving this result, we also develop a formalization of the notion of parsing.

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