Ronald de Wolf
Published 2005-05-25, updated 2006-04-25Version 2
The rigidity of a matrix measures how many of its entries need to be changed in order to reduce its rank to some value. Good lower bounds on the rigidity of an explicit matrix would imply good lower bounds for arithmetic circuits as well as for communication complexity. Here we reprove the best known bounds on the rigidity of Hadamard matrices, due to Kashin and Razborov, using tools from quantum computing. Our proofs are somewhat simpler than earlier ones (at least for those familiar with quantum) and give slightly better constants. More importantly, they give a new approach to attack this longstanding open problem.
Comments: 10 pages LaTeX, 2nd version: some discussion added. This version to appear in ICALP 2006 conference
Two theorems of Jhon Bell and Communication Complexity
A limit on nonlocality in any world in which communication complexity is not trivial
Tight upper and lower bounds to the eigenvalues and critical parameters of a double well
