Title :
Counting axioms do not polynomially simulate counting gates
Author :
Impagliazzo, Russell ; Segerlind, N.
Author_Institution :
Dept. of Comput. Sci., California Univ., San Diego, La Jolla, CA, USA
Abstract :
We give a family of tautologies whose algebraic translations have constant-degree, polynomial size polynomial calculus refutations over Z2, but which require superpolynomial size bounded-depth Frege proofs from Count2 axioms. This gives a superpolynomial size separation of bounded-depth Frege plus mod 2 counting axioms from bounded-depth Frege plus parity gates. Combined with another result of the authors, it gives the first size (as opposed to degree) separation between the polynomial calculus and Nullstellensatz systems.
Keywords :
decision trees; formal logic; polynomials; theorem proving; Count2 axioms; Counting Axioms; Counting Gates; Nullstellensatz systems; algebraic translations; bounded-depth Frege; bounded-depth Frege proofs; polynomial calculus; polynomial size polynomial calculus; tautologies; Approximation methods; Calculus; Circuits; Complexity theory; Computational modeling; Computer science; Computer simulation; Decision trees; Polynomials;
Conference_Titel :
Foundations of Computer Science, 2001. Proceedings. 42nd IEEE Symposium on
Print_ISBN :
0-7695-1116-3
DOI :
10.1109/SFCS.2001.959894
