Two operators, join and equivalence, are defined on R, a polynomial-time verifiable binary relation witnessing language A in NP. It is proved that if R has these two operators and there is an instance of A with certain specific properties, then A is NP-complete. Relations with the above properties are called universal relations. It is shown that if set A has a universal relation, then for any set B in NP, there is a reduction f from B to A such that for every x, one can recover the set of witnesses of x from that of f(x). Further, it is shown that obvious witnessing relations of some well-known complete problems as well as those of k-creative sets are universal, whereas an obvious witnessing relation for the graph isomorphism problem is not...
The thesis formulates and proves a witnessing theorem for SPV -provable formulas in the form ∀x∃yA(x...
A sequence of results which characterize exactly the complexity of problems related to the evaluatio...
We show that polynomial time Turing equivalence and a large class of other equivalence relations fro...
AbstractThis paper follows the methodology introduced by Agrawal and Biswas in [Manindra Agrawal, So...
AbstractAgrawal and Biswas (1992) define a notion stronger than NP-completeness. With every language...
We study computably enumerable equivalence relations (ceers), under the reducibility R ≤ S if there ...
We investigate the problem of what equivalence relations from recursion theory are universal countab...
Abstract. We study computably enumerable equivalence relations (ceers), under the reducibility R ≤ S...
AbstractWe present two results about witness functions for sets in NP and coNP. First, any set that ...
To determine if two given lists of numbers are the same set, we would sort both lists and see if we ...
The thesis consists of a collection of my contributions to universal algebra. Motivated by the Const...
AbstractWe explore the natural question of whether all NP-complete problems have a common restrictio...
Computable reducibility of equivalence relations is a tool to compare the complexity of equivalence ...
AbstractThe concept of translation of relation schemes is introduced. Some characterizations of vari...
One problem concerning the universal relation assumption is the inability of known methods to obtain...
The thesis formulates and proves a witnessing theorem for SPV -provable formulas in the form ∀x∃yA(x...
A sequence of results which characterize exactly the complexity of problems related to the evaluatio...
We show that polynomial time Turing equivalence and a large class of other equivalence relations fro...
AbstractThis paper follows the methodology introduced by Agrawal and Biswas in [Manindra Agrawal, So...
AbstractAgrawal and Biswas (1992) define a notion stronger than NP-completeness. With every language...
We study computably enumerable equivalence relations (ceers), under the reducibility R ≤ S if there ...
We investigate the problem of what equivalence relations from recursion theory are universal countab...
Abstract. We study computably enumerable equivalence relations (ceers), under the reducibility R ≤ S...
AbstractWe present two results about witness functions for sets in NP and coNP. First, any set that ...
To determine if two given lists of numbers are the same set, we would sort both lists and see if we ...
The thesis consists of a collection of my contributions to universal algebra. Motivated by the Const...
AbstractWe explore the natural question of whether all NP-complete problems have a common restrictio...
Computable reducibility of equivalence relations is a tool to compare the complexity of equivalence ...
AbstractThe concept of translation of relation schemes is introduced. Some characterizations of vari...
One problem concerning the universal relation assumption is the inability of known methods to obtain...
The thesis formulates and proves a witnessing theorem for SPV -provable formulas in the form ∀x∃yA(x...
A sequence of results which characterize exactly the complexity of problems related to the evaluatio...
We show that polynomial time Turing equivalence and a large class of other equivalence relations fro...