Revised: May 2, 2022
Published: July 9, 2022
Abstract: [Plain Text Version]
Sign-rank and discrepancy are two central notions in communication complexity. The seminal paper by Babai, Frankl, and Simon (FOCS'86) initiated an active line of research that investigates the gap between these two notions. In this article, we establish the strongest possible separation by constructing a boolean matrix whose sign-rank is only 3ドル,ドル and yet its discrepancy is 2ドル^{-\Omega(n)}$. We note that every matrix of sign-rank 2ドル$ has discrepancy $n^{-O(1)}$.
In connection with learning theory, our result implies the existence of Boolean matrices whose entries are represented by points and half-spaces in dimension 3ドル,ドル and yet, the normalized margin of any such representation (angle between the half-spaces and the unit vectors representing the points), even in higher dimensions, is very small.
In the context of communication complexity, our result in particular implies that there are boolean functions with $O(1)$ unbounded-error randomized communication complexity while having $\Omega(n)$ weakly unbounded-error randomized communication complexity.
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A conference version of this paper appeared in the Proceedings of the 35th Computational Complexity Conference, 2020 (CCC'20).