AbstractA programming approach to computability and complexity theory yields more natural definitions and proofs of central results than the classical approach. Further, some new results can be obtained using this viewpoint. This paper contains new intrinsic characterizations of the well-known complexity classes PTIME and LOGSPACE, with no externally imposed resource bounds on time or space. LOGSPACE is proven identical with the decision problems solvable by read-only imperative programs on Lisp-like lists; and PTIME is proven identical with the problems solvable by recursive read-only programs
this paper a series of languages adequate for expressing exactly those properties checkable in a ser...
A notion of log space Turing reducibility is introduced. It is used to define relative notions of lo...
AbstractWe show that some open problems concerning comparative schematology and logics of programs a...
AbstractA programming approach to computability and complexity theory yields more natural definition...
AbstractThe author's forthcoming book proves central results in computability and complexity theory ...
We introduce an imperative programming language equipped with variables of higher types. Fragments o...
We consider the infinite versions of the usual computational complexity questions LogSpace?=P, NLogS...
A definition of self-reducibility is proposed to deal with logarithmic space complexity classes. A g...
A major complexity classes are $L$, $POLYLOGTIME$ and $\oplus L$. A logarithmic Turing machine has a...
A major complexity classes are L and ⊕L (parity-L). A logarithmic space Turing machine has a read-on...
. We refine the techniques of Beigel, Gill, Hertrampf [4] who investigated polynomial time counting ...
2. Overview of Complexity Classes below $\mathrm{P} $ 2 2.1. Definitions and basic notions 2.2. Some...
P versus NP is considered as one of the most important open problems in computer science. This consi...
AbstractThe computation tree of a nondeterministic machineMwith inputxgives rise to aleaf stringform...
Bounded arithmetic is a branch of mathematical logic which characterize various classes of computati...
this paper a series of languages adequate for expressing exactly those properties checkable in a ser...
A notion of log space Turing reducibility is introduced. It is used to define relative notions of lo...
AbstractWe show that some open problems concerning comparative schematology and logics of programs a...
AbstractA programming approach to computability and complexity theory yields more natural definition...
AbstractThe author's forthcoming book proves central results in computability and complexity theory ...
We introduce an imperative programming language equipped with variables of higher types. Fragments o...
We consider the infinite versions of the usual computational complexity questions LogSpace?=P, NLogS...
A definition of self-reducibility is proposed to deal with logarithmic space complexity classes. A g...
A major complexity classes are $L$, $POLYLOGTIME$ and $\oplus L$. A logarithmic Turing machine has a...
A major complexity classes are L and ⊕L (parity-L). A logarithmic space Turing machine has a read-on...
. We refine the techniques of Beigel, Gill, Hertrampf [4] who investigated polynomial time counting ...
2. Overview of Complexity Classes below $\mathrm{P} $ 2 2.1. Definitions and basic notions 2.2. Some...
P versus NP is considered as one of the most important open problems in computer science. This consi...
AbstractThe computation tree of a nondeterministic machineMwith inputxgives rise to aleaf stringform...
Bounded arithmetic is a branch of mathematical logic which characterize various classes of computati...
this paper a series of languages adequate for expressing exactly those properties checkable in a ser...
A notion of log space Turing reducibility is introduced. It is used to define relative notions of lo...
AbstractWe show that some open problems concerning comparative schematology and logics of programs a...