AbstractBuilding on a recent breakthrough by Ogihara, we resolve a conjecture made by Hartmanis in 1978 regarding the (non)existence of sparse sets complete for P under logspace many–one reductions. We show that if there exists a sparse hard set for P under logspace many–one reductions, then P=LOGSPACE. We further prove that if P has a sparse hard set under many–one reductions computable in NC1, then P collapses to NC1
We study the sparse set conjecture for sets with low density. The sparse set conjecture states that ...
AbstractWe investigate the frequency of complete sets for various complexity classes within EXP unde...
The purpose of this paper is to review the origins and motivation for the conjecture that sparse NP...
AbstractWe resolve a conjecture of Hartmanis from 1978 about sparse hard sets for nondeterministic l...
In 1978, Hartmanis conjectured that there exist no sparse complete sets for P under logspace many-on...
. Recently a 1978 conjecture by Hartmanis was resolved by Cai and Sivakumar, following progress made...
If there is a sparse set hard for P under bounded truth table reductions computable in LOGSPACE or N...
We prove that there is no sparse hard set for P under logspace computable bounded truthtable reducti...
AbstractWe prove that there is no sparse hard set for P under logspace computable bounded truth-tabl...
In this paper we study the consequences of the existence of sparse hard sets for different complexit...
Hartmanis and Berman have conjectured that all NP-complete sets are polynomial time isomorphic. A c...
We investigate the structure of EXP and NEXP complete and hard sets under various kinds of reduction...
This paper discusses advances, due to the work of Cai, Naik, and Sivakumar and Glasser, in the compl...
In this paper we study the consequences of the existence of sparse hard sets for different complexit...
We investigate the frequency of complete sets for various complexity classes within EXP under sever...
We study the sparse set conjecture for sets with low density. The sparse set conjecture states that ...
AbstractWe investigate the frequency of complete sets for various complexity classes within EXP unde...
The purpose of this paper is to review the origins and motivation for the conjecture that sparse NP...
AbstractWe resolve a conjecture of Hartmanis from 1978 about sparse hard sets for nondeterministic l...
In 1978, Hartmanis conjectured that there exist no sparse complete sets for P under logspace many-on...
. Recently a 1978 conjecture by Hartmanis was resolved by Cai and Sivakumar, following progress made...
If there is a sparse set hard for P under bounded truth table reductions computable in LOGSPACE or N...
We prove that there is no sparse hard set for P under logspace computable bounded truthtable reducti...
AbstractWe prove that there is no sparse hard set for P under logspace computable bounded truth-tabl...
In this paper we study the consequences of the existence of sparse hard sets for different complexit...
Hartmanis and Berman have conjectured that all NP-complete sets are polynomial time isomorphic. A c...
We investigate the structure of EXP and NEXP complete and hard sets under various kinds of reduction...
This paper discusses advances, due to the work of Cai, Naik, and Sivakumar and Glasser, in the compl...
In this paper we study the consequences of the existence of sparse hard sets for different complexit...
We investigate the frequency of complete sets for various complexity classes within EXP under sever...
We study the sparse set conjecture for sets with low density. The sparse set conjecture states that ...
AbstractWe investigate the frequency of complete sets for various complexity classes within EXP unde...
The purpose of this paper is to review the origins and motivation for the conjecture that sparse NP...