AbstractThere is a single set that is complete for a variety of nondeterministic time complexity classes with respect to related versions of m-reducibility. This observation immediately leads to transfer results for determinism versus nondeterminism solutions. Also, an upward transfer of collapses of certain oracle hierarchies, built analogously to the polynomial-time or the linear-time hierarchies, can be shown by means of uniformly constructed sets that are complete for related levels of all these hierarchies. A similar result holds for difference hierarchies over nondeterministic complexity classes. Finally, we give an oracle set relative to which the nondeterministic classes coincide with the deterministic ones, for several sets of time...
AbstractLog space reducibility allows a meaningful study of complexity and completeness for the clas...
AbstractWe consider the relation between the relativized polynomial time hierarchy and relativizatio...
Relativizations of complexity classes in which simple sets exist are considered. A recursive oracle ...
AbstractThere is a single set that is complete for a variety of nondeterministic time complexity cla...
We investigate the relationship between the classes of languages accepted by deterministic and nonde...
AbstractRelativized forms of deterministic and nondeterministic time complexity classes are consider...
AbstractNew proofs of two properties of the polynomial-time hierarchy are given. The classes in the ...
A set is autoreducible if it can be reduced to itself by a Turing machine that does not ask its own ...
We investigate the following: (1) the relationship between the classes of languages accepted by det...
We study properties of resource-- and otherwise bounded reductions and corresponding completeness no...
We strengthen the nondeterministic hierarchy theorem for non-deterministic polynomial time to show t...
AbstractL. Berman [1] has proved completeness results for the theories Th(R, +, 0) and Th(N, +, 0) i...
AbstractWe show that there is a set that is almost complete but not complete under polynomial-time m...
Denote X the class of sets relative to which P = NP relativized and Z the class of sets relative to ...
Complexity classes defined by time-bounded and space-bounded Turing acceptors are studied in order t...
AbstractLog space reducibility allows a meaningful study of complexity and completeness for the clas...
AbstractWe consider the relation between the relativized polynomial time hierarchy and relativizatio...
Relativizations of complexity classes in which simple sets exist are considered. A recursive oracle ...
AbstractThere is a single set that is complete for a variety of nondeterministic time complexity cla...
We investigate the relationship between the classes of languages accepted by deterministic and nonde...
AbstractRelativized forms of deterministic and nondeterministic time complexity classes are consider...
AbstractNew proofs of two properties of the polynomial-time hierarchy are given. The classes in the ...
A set is autoreducible if it can be reduced to itself by a Turing machine that does not ask its own ...
We investigate the following: (1) the relationship between the classes of languages accepted by det...
We study properties of resource-- and otherwise bounded reductions and corresponding completeness no...
We strengthen the nondeterministic hierarchy theorem for non-deterministic polynomial time to show t...
AbstractL. Berman [1] has proved completeness results for the theories Th(R, +, 0) and Th(N, +, 0) i...
AbstractWe show that there is a set that is almost complete but not complete under polynomial-time m...
Denote X the class of sets relative to which P = NP relativized and Z the class of sets relative to ...
Complexity classes defined by time-bounded and space-bounded Turing acceptors are studied in order t...
AbstractLog space reducibility allows a meaningful study of complexity and completeness for the clas...
AbstractWe consider the relation between the relativized polynomial time hierarchy and relativizatio...
Relativizations of complexity classes in which simple sets exist are considered. A recursive oracle ...