This monograph presents recursion theory from a generalized and largely global point of view. A major theme is the study of the structures of degrees arising from two key notions of reducibility, the Turing degrees and the hyperdegrees, using ideas and techniques beyond those of classical recursion theory. These include structure theory, hyperarithmetic determinacy and rigidity, basis theorems, independence results on Turing degrees, as well as applications to higher randomness
The theory of analog computation aims at modeling computational systems that evolve in a continuous ...
We provide machine-independent characterizations of some complexity classes, over an arbitrary struc...
The SAGE Encyclopedia of Human Communication Sciences and DisordersRecursion is a mathematical princ...
In Recursion Theory (Computability Theory), we study Turing degrees in terms of their degree-theoret...
Central concerns of the book are related theories of recursively enumerable sets, of degree of un-so...
These proceedings contain research and survey papers from many subfields of recursion theory, with e...
Several problems in recursion theory on admissible o¡dinals (a-recursion theory) and recursion theor...
The material presented in this paper lies in the realm of recursive function theory. Major emphasis ...
The notion of recursiveness is treated in a model-theoretical way by using a particular instance of ...
What can we compute--even with unlimited resources? Is everything within reach? Or are computations ...
AbstractSeveral problems in recursion theory on admissible ordinals (α-recursion theory) and recursi...
Our goal is to approach the classes of computational complexity P, NP, and Pspace in a recursion-the...
SETS, MODELS, AND PROOFS: TOPICS IN THE THEORY OF RECURSIVE FUNCTIONS David Roger Belanger, Ph.D. Co...
Subrecursive degrees are partitions of computable (recursive) functions generated by strong reducibi...
Reflexive Structures: An Introduction to Computability Theory is concerned with the foundations of t...
The theory of analog computation aims at modeling computational systems that evolve in a continuous ...
We provide machine-independent characterizations of some complexity classes, over an arbitrary struc...
The SAGE Encyclopedia of Human Communication Sciences and DisordersRecursion is a mathematical princ...
In Recursion Theory (Computability Theory), we study Turing degrees in terms of their degree-theoret...
Central concerns of the book are related theories of recursively enumerable sets, of degree of un-so...
These proceedings contain research and survey papers from many subfields of recursion theory, with e...
Several problems in recursion theory on admissible o¡dinals (a-recursion theory) and recursion theor...
The material presented in this paper lies in the realm of recursive function theory. Major emphasis ...
The notion of recursiveness is treated in a model-theoretical way by using a particular instance of ...
What can we compute--even with unlimited resources? Is everything within reach? Or are computations ...
AbstractSeveral problems in recursion theory on admissible ordinals (α-recursion theory) and recursi...
Our goal is to approach the classes of computational complexity P, NP, and Pspace in a recursion-the...
SETS, MODELS, AND PROOFS: TOPICS IN THE THEORY OF RECURSIVE FUNCTIONS David Roger Belanger, Ph.D. Co...
Subrecursive degrees are partitions of computable (recursive) functions generated by strong reducibi...
Reflexive Structures: An Introduction to Computability Theory is concerned with the foundations of t...
The theory of analog computation aims at modeling computational systems that evolve in a continuous ...
We provide machine-independent characterizations of some complexity classes, over an arbitrary struc...
The SAGE Encyclopedia of Human Communication Sciences and DisordersRecursion is a mathematical princ...