Add to ORKGThis paper studies possible extensions of the concept of complexity class of recursive functions to partial recursive functions. Many of the well-known results for total complexity classes are shown to have corresponding, though not exactly identical, statements for partial classes. In particular, with two important exceptions, all results on the presentation and decision problems of membership for the two most reasonable definitions of partial classes are the same as for total classes. The exceptions concern presentations of the complements and maximum difficulty for decision problems of the more restricted form of partial classes. The last section of this paper shows that it is not possible to have an "Intersection Theorem", correspo...
AbstractRecursive analysis, the theory of computation of functions on real numbers, has been studied...
SIGLECopy held by FIZ Karlsruhe; available from UB/TIB Hannover / FIZ - Fachinformationszzentrum Kar...
We consider a measure Φ of computational complexity. The measure Φ determinesa binary relation on th...
This paper studies possible extensions of the concept of complexity class of recursive functions to ...
This paper studies possible extensions of the concept of complexity class of recursive functions to ...
It is proven that complexity classes of abstract measures of complexity need not be recursively enum...
In a msdel for a mef-Siire of computat ional complexi ty, <t>, for a part ial recursive func...
AbstractComplexity measures and provable recursive functions (p-functions) are combined to define a ...
AbstractWe show that any recursive sequence of recursive sets which is ascending with respect to the...
AbstractThe intrinsic complexity of learning compares the difficulty of learning classes of objects ...
Rapport interne.In this paper, we provide several machine-independent characterizations of determini...
AbstractIn this paper, complexity classes of functions defined via taking maxima or minima (cf. the ...
We define polynomial time computable operator. Our definition generalizes Cook's definition to arbi...
We define polynomial time computable operator. Our definition generalizes Cook's definition to arbit...
We define polynomial time computable operator. Our definition generalizes Cook's definition to arbit...
AbstractRecursive analysis, the theory of computation of functions on real numbers, has been studied...
SIGLECopy held by FIZ Karlsruhe; available from UB/TIB Hannover / FIZ - Fachinformationszzentrum Kar...
We consider a measure Φ of computational complexity. The measure Φ determinesa binary relation on th...
This paper studies possible extensions of the concept of complexity class of recursive functions to ...
This paper studies possible extensions of the concept of complexity class of recursive functions to ...
It is proven that complexity classes of abstract measures of complexity need not be recursively enum...
In a msdel for a mef-Siire of computat ional complexi ty, <t>, for a part ial recursive func...
AbstractComplexity measures and provable recursive functions (p-functions) are combined to define a ...
AbstractWe show that any recursive sequence of recursive sets which is ascending with respect to the...
AbstractThe intrinsic complexity of learning compares the difficulty of learning classes of objects ...
Rapport interne.In this paper, we provide several machine-independent characterizations of determini...
AbstractIn this paper, complexity classes of functions defined via taking maxima or minima (cf. the ...
We define polynomial time computable operator. Our definition generalizes Cook's definition to arbi...
We define polynomial time computable operator. Our definition generalizes Cook's definition to arbit...
We define polynomial time computable operator. Our definition generalizes Cook's definition to arbit...
AbstractRecursive analysis, the theory of computation of functions on real numbers, has been studied...
SIGLECopy held by FIZ Karlsruhe; available from UB/TIB Hannover / FIZ - Fachinformationszzentrum Kar...
We consider a measure Φ of computational complexity. The measure Φ determinesa binary relation on th...