Title :
Hard-core distributions for somewhat hard problems
Author :
Impagliazzo, Russell
Author_Institution :
Dept. of Comput. Sci. & Eng., California Univ., San Diego, La Jolla, CA, USA
Abstract :
Consider a decision problem that cannot be 1-δ approximated by circuits of a given size in the sense that any such circuit fails to give the correct answer on at least a δ fraction of instances. We show that for any such problem there is a specific “hard core” set of inputs which is at least a δ fraction of all inputs and on which no circuit of a slightly smaller size can get even a small advantage over a random guess. More generally, our argument holds for any non uniform model of computation closed under majorities. We apply this result to get a new proof of the Yao XOR lemma (A.C. Yao, 1982), and to get a related XOR lemma for inputs that are only k wise independent
Keywords :
Boolean functions; computational complexity; decision theory; probability; Boolean function; Yao XOR lemma; computational problem; decision problem; hard core distributions; hard problems; hard-core distributions; k wise independent; non uniform mode; probability; random guess; Boolean functions; Circuits; Complexity theory; Computational modeling; Computer science; Distributed computing; Drives; Polynomials;
Conference_Titel :
Foundations of Computer Science, 1995. Proceedings., 36th Annual Symposium on
Conference_Location :
Milwaukee, WI
Print_ISBN :
0-8186-7183-1
DOI :
10.1109/SFCS.1995.492584
