AbstractThe class NC1 of problems solvable by bounded fan-in circuit families of logarithmic depth is known to be contained in logarithmic space L, but not much about the converse is known. In this paper we examine the structure of classes in between NC1 and L based on counting functions or, equivalently, based on arithmetic circuits. The classes PNC1 and C=NC1, defined by a test for positivity and a test for zero, respectively, of arithmetic circuit families of logarithmic depth, sit in this complexity interval. We study the landscape of Boolean hierarchies, constant-depth oracle hierarchies, and logarithmic-depth oracle hierarchies over PNC1 and C=NC1. We provide complete problems, obtain the upper bound L for all these hierarchies, and p...
AbstractPresented here are an algebra and a logic characterizing the complexity class NC1, which con...
We consider the power of single level circuits in the context of graph complexity. We first prove th...
AbstractTwo properties, called semi-unboundedness and polynomial proof-size, are identified as key p...
AbstractThe class NC1 of problems solvable by bounded fan-in circuit families of logarithmic depth i...
Abstract. The class NC1 of problems solvable by bounded fan-in circuit families of logarithmic depth...
AbstractWe define the counting classes #NC1,GapNC1,PNC1, andC=NC1. We prove that boolean circuits, a...
We study under what circumstances different uniformity notions for Boolean circuits of logarithmic d...
Constant-depth arithmetic circuits have been dened and studied in [AAD97, ABL98]; these circuits yie...
The boolean circuit complexity classes AC 0 ⊆ AC 0[m] ⊆ TC 0 ⊆ NC 1 have been studied intensely. Oth...
Boolean circuits were introduced in complexity theory to provide a model for parallel computation. A...
We study under what circumstances different uniformity notions for Boolean circuits of logarithmic d...
Presented here are an algebra and a logic characterizing the complexity class NC1, which consists of...
AbstractWe show the containment of several classes of languages in NC1. These include the binary enc...
In [AO96], it is stated (without proof) that if NC 1 (#L) = AC 0 (#L), then the #L hierarchy col...
An algorithmic meta theorem for a logic and a class C of structures states that all problems express...
AbstractPresented here are an algebra and a logic characterizing the complexity class NC1, which con...
We consider the power of single level circuits in the context of graph complexity. We first prove th...
AbstractTwo properties, called semi-unboundedness and polynomial proof-size, are identified as key p...
AbstractThe class NC1 of problems solvable by bounded fan-in circuit families of logarithmic depth i...
Abstract. The class NC1 of problems solvable by bounded fan-in circuit families of logarithmic depth...
AbstractWe define the counting classes #NC1,GapNC1,PNC1, andC=NC1. We prove that boolean circuits, a...
We study under what circumstances different uniformity notions for Boolean circuits of logarithmic d...
Constant-depth arithmetic circuits have been dened and studied in [AAD97, ABL98]; these circuits yie...
The boolean circuit complexity classes AC 0 ⊆ AC 0[m] ⊆ TC 0 ⊆ NC 1 have been studied intensely. Oth...
Boolean circuits were introduced in complexity theory to provide a model for parallel computation. A...
We study under what circumstances different uniformity notions for Boolean circuits of logarithmic d...
Presented here are an algebra and a logic characterizing the complexity class NC1, which consists of...
AbstractWe show the containment of several classes of languages in NC1. These include the binary enc...
In [AO96], it is stated (without proof) that if NC 1 (#L) = AC 0 (#L), then the #L hierarchy col...
An algorithmic meta theorem for a logic and a class C of structures states that all problems express...
AbstractPresented here are an algebra and a logic characterizing the complexity class NC1, which con...
We consider the power of single level circuits in the context of graph complexity. We first prove th...
AbstractTwo properties, called semi-unboundedness and polynomial proof-size, are identified as key p...