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Query-to-Communication Lifting for BPP
Published 22 Mar 2017 in cs.CC | (1703.07666v1)
Abstract: For any $n$-bit boolean function $f$, we show that the randomized communication complexity of the composed function $f\circ gn$, where $g$ is an index gadget, is characterized by the randomized decision tree complexity of $f$. In particular, this means that many query complexity separations involving randomized models (e.g., classical vs. quantum) automatically imply analogous separations in communication complexity.
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