In order to study circuit complexity classes within NC¹ in a uniform setting, we need a uniformity condition which is more restrictive than those in common use. Two such conditions, stricter than NC¹ uniformity [Ru81,Co85], have appeared in recent research: Immerman's families of circuits defined by first-order formulas [Im87a,Im87b] and a uniformity corresponding to Buss' deterministic log-time reductions [Bu87]. We show that these two notions are equivalent, leading to a natural notion of uniformity for low-level circuit complexity classes. We show that recent results on the structure of NC¹ [Ba89] still hold true in this very uniform setting. Finally, we investigate a parallel notion of uniformity, still more restrictive, based...
It is shown that the time needed by a concurrent-read, concurrentwrite parallel random access machin...
We introduce a natural set of arithmetic expressions and define the complexity class AE to consist ...
We investigate computing models that are presented as families of finite computing devices with a un...
AbstractIn order to study circuit complexity classes within NC1 in a uniform setting, we need a unif...
We study under what circumstances different uniformity notions for NC 1 lead to the same complexit...
Abstract. Imposing an extensional uniformity condition on a non-uniform circuit complexity class C m...
We study under what circumstances different uniformity notions for Boolean circuits of logarithmic d...
We investigate computing models that are presented as families of finite computing devices with a un...
18 pp.We consider a new notion of circuit uniformity based on the concept of rational relations, cal...
AbstractWe argue that uniform circuit complexity introduced by Borodin is a reasonable model of para...
We investigate computing models that are presented as families of finite computing devices with a u...
We strengthen the nondeterministic hierarchy theorem for non-deterministic polynomial time to show t...
We show that uniform families of ACC circuits of subexponential size cannot compute the permanent fu...
grantor: University of TorontoThis thesis studies models and limitations of non-uniform co...
AbstractAllen, B., Arithmetizing Uniform NC, Annals of Pure and Applied Logic 53 (1991) 1–50.We give...
It is shown that the time needed by a concurrent-read, concurrentwrite parallel random access machin...
We introduce a natural set of arithmetic expressions and define the complexity class AE to consist ...
We investigate computing models that are presented as families of finite computing devices with a un...
AbstractIn order to study circuit complexity classes within NC1 in a uniform setting, we need a unif...
We study under what circumstances different uniformity notions for NC 1 lead to the same complexit...
Abstract. Imposing an extensional uniformity condition on a non-uniform circuit complexity class C m...
We study under what circumstances different uniformity notions for Boolean circuits of logarithmic d...
We investigate computing models that are presented as families of finite computing devices with a un...
18 pp.We consider a new notion of circuit uniformity based on the concept of rational relations, cal...
AbstractWe argue that uniform circuit complexity introduced by Borodin is a reasonable model of para...
We investigate computing models that are presented as families of finite computing devices with a u...
We strengthen the nondeterministic hierarchy theorem for non-deterministic polynomial time to show t...
We show that uniform families of ACC circuits of subexponential size cannot compute the permanent fu...
grantor: University of TorontoThis thesis studies models and limitations of non-uniform co...
AbstractAllen, B., Arithmetizing Uniform NC, Annals of Pure and Applied Logic 53 (1991) 1–50.We give...
It is shown that the time needed by a concurrent-read, concurrentwrite parallel random access machin...
We introduce a natural set of arithmetic expressions and define the complexity class AE to consist ...
We investigate computing models that are presented as families of finite computing devices with a un...