Measure-theoretic aspects of the polynomial-time many-one reducibility structure of the exponential time complexity classes E=DTIME(2^linear) and E2=DTIME(2^polynomial) are investigated. Particular attention is given to the complexity (measured by the size of complexity cores) and distribution (abundance in the sense of measure) of languages that are polynomial-time many-one hard for E and other complexity classes. Tight upper and lower bounds on the size of complexity cores of hard languages are derived. The upper bounds say that the polynomial-time many-one hard languages for E are unusually simple, in the sense that they have smaller complexity cores than most languages in E. It follows that the polynomial-time many-one complete langua...
We investigate the relationship between the classes of languages accepted by deterministic and nonde...
The resource-bounded measures of complexity classes are shown to be robust with respect to certain c...
AbstractWe investigate the frequency of complete sets for various complexity classes within EXP unde...
Measure-theoretic aspects of the P m-reducibility structure of the exponential time complexity class...
Measure-theoretic aspects of the polynomial-time many-one reducibility structure of the exponential ...
Department of Computer Science Iowa State University Ames, Iowa 50010 Recent results on the internal...
Every language that is polynomial time many-one hard for ESPACE is shown to have unusually small com...
ABSTRACT Recent results on the internal measuretheoretic structure of the exponential time complexi...
We show that hard sets $S$ for $\NP$ must have exponential density, i.e. $|S_{=n}| \geq 2^{n^\epsilo...
AbstractWe show that any recursive sequence of recursive sets which is ascending with respect to the...
Ogiwara and Watanabe have recently shown that the hypothesis P ¿ NP implies that no (polynomially) s...
Introduction In the previous two chapters, we have ffl introduced the basic complexity classes, ffl...
Denote X the class of sets relative to which P = NP relativized and Z the class of sets relative to ...
A weak completeness phenomenon is investigated in the complexity class E = DTIME(2 linear ). Accor...
This paper proves that the complexity class Ef)P, parity polynomial time [PZ83], contains the class ...
We investigate the relationship between the classes of languages accepted by deterministic and nonde...
The resource-bounded measures of complexity classes are shown to be robust with respect to certain c...
AbstractWe investigate the frequency of complete sets for various complexity classes within EXP unde...
Measure-theoretic aspects of the P m-reducibility structure of the exponential time complexity class...
Measure-theoretic aspects of the polynomial-time many-one reducibility structure of the exponential ...
Department of Computer Science Iowa State University Ames, Iowa 50010 Recent results on the internal...
Every language that is polynomial time many-one hard for ESPACE is shown to have unusually small com...
ABSTRACT Recent results on the internal measuretheoretic structure of the exponential time complexi...
We show that hard sets $S$ for $\NP$ must have exponential density, i.e. $|S_{=n}| \geq 2^{n^\epsilo...
AbstractWe show that any recursive sequence of recursive sets which is ascending with respect to the...
Ogiwara and Watanabe have recently shown that the hypothesis P ¿ NP implies that no (polynomially) s...
Introduction In the previous two chapters, we have ffl introduced the basic complexity classes, ffl...
Denote X the class of sets relative to which P = NP relativized and Z the class of sets relative to ...
A weak completeness phenomenon is investigated in the complexity class E = DTIME(2 linear ). Accor...
This paper proves that the complexity class Ef)P, parity polynomial time [PZ83], contains the class ...
We investigate the relationship between the classes of languages accepted by deterministic and nonde...
The resource-bounded measures of complexity classes are shown to be robust with respect to certain c...
AbstractWe investigate the frequency of complete sets for various complexity classes within EXP unde...