Title :
On the random-self-reducibility of complete sets
Author :
Feigenbaum, Joan ; Fortnow, Lance
Author_Institution :
AT&T Bell Labs., Murray Hill, NJ, USA
fDate :
30 Jun-3 Jul 1991
Abstract :
Informally, a function f is random-self-reducible if the evaluation of f at any given instance x can be reduced in polynomial time to the evaluation of f at one or more random instances yi. A set is random-self-reducible if its characteristic function is. The authors generalize the previous formal definitions of random-self-reducibility. They show that, even under this very general definition, sets that are complete for any level of the polynomial hierarchy are not random-self-reducible, unless the hierarchy collapses. In particular, NP-complete sets are not random-self-reducible, unless the hierarchy collapses at the third level. By contrast, the authors show that sets complete for the classes PP and MODmP are random-self-reducible
Keywords :
computational complexity; set theory; MODmP; NP-complete sets; PP; characteristic function; polynomial hierarchy; polynomial time; random instances; random-self-reducibility; third level; Application software; Computer science; Cryptographic protocols; Cryptography; Polynomials; Random number generation;
Conference_Titel :
Structure in Complexity Theory Conference, 1991., Proceedings of the Sixth Annual
Conference_Location :
Chicago, IL
Print_ISBN :
0-8186-2255-5
DOI :
10.1109/SCT.1991.160252
