On the Computational Power of RNNs

June 14, 2019 ยท Declared Dead ยท ๐Ÿ› arXiv.org

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Authors Samuel A. Korsky, Robert C. Berwick arXiv ID 1906.06349 Category cs.CL: Computation & Language Cross-listed cs.LG Citations 43 Venue arXiv.org Last Checked 4 months ago
Abstract
Recent neural network architectures such as the basic recurrent neural network (RNN) and Gated Recurrent Unit (GRU) have gained prominence as end-to-end learning architectures for natural language processing tasks. But what is the computational power of such systems? We prove that finite precision RNNs with one hidden layer and ReLU activation and finite precision GRUs are exactly as computationally powerful as deterministic finite automata. Allowing arbitrary precision, we prove that RNNs with one hidden layer and ReLU activation are at least as computationally powerful as pushdown automata. If we also allow infinite precision, infinite edge weights, and nonlinear output activation functions, we prove that GRUs are at least as computationally powerful as pushdown automata. All results are shown constructively.
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