Affiliation:
1. University of Puerto Rico, Rio Piedras
2. Stanford University
Abstract
The fastest known randomized algorithms for several parameterized problems use reductions to the
k
-M
l
D problem: detection of multilinear monomials of degree
k
in polynomials presented as circuits. The fastest known algorithm for
k
-M
l
D is based on 2
k
evaluations of the circuit over a suitable algebra. We use communication complexity to show that it is essentially optimal within this evaluation framework. On the positive side, we give additional applications of the method: finding a copy of a given tree on
k
nodes, a minimum set of nodes that dominate at least
t
nodes, and an
m
-dimensional
k
-matching. In each case, we achieve a faster algorithm than what was known before. We also apply the algebraic method to problems in exact counting. Among other results, we show that a variation of it can break the trivial upper bounds for the disjoint summation problem.
Funder
David Morgenthaler II Faculty Fellowship
Sloan Fellowship
Microsoft Research Fellowship
NSF CAREER
NSF
Publisher
Association for Computing Machinery (ACM)
Subject
Mathematics (miscellaneous)
Cited by
17 articles.
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