AbstractWe introduce Computational Depth, a measure for the amount of “nonrandom” or “useful” information in a string by considering the difference of various Kolmogorov complexity measures. We investigate three instantiations of Computational Depth:•Basic Computational Depth, a clean notion capturing the spirit of Bennett's Logical Depth. We show that a Turing machine M runs in time polynomial on average over the time-bounded universal distribution if and only if for all inputs x, M uses time exponential in the basic computational depth of x.•Sublinear-time Computational Depth and the resulting concept of Shallow Sets, a generalization of sparse and random sets based on low depth properties of their characteristic sequences. We show that e...
Boolean circuits were introduced in complexity theory to provide a model for parallel computation. A...
This paper investigates Bennett\u27s notions of strong and weak computational depth (also called log...
The logical depth with significance b of a string x is the shortest running time of a program for x ...
Torturing an uninformed witness cannot give information about the crime. Leonid Levin [Lev84] Abstra...
AbstractWe introduce Computational Depth, a measure for the amount of “nonrandom” or “useful” inform...
Depth of an object concerns a tradeoff between computation time and excess of pro-gram length over t...
Depth of an object concerns a tradeoff between computation time and excess of program length over th...
Antunes, Fortnow, van Melkebeek and Vinodchandran captured the notion of non-random information by c...
We introduce a general framework for defining the depth of an infinite binary sequence with respect...
The structure and organization of information in binary strings and (infinite) binary sequences are ...
We show that real-value approximations of Kolmogorov-Chaitin complexity K(s) using the algorithmic c...
The logical depth of a reversible Turing machine equals the shortest running time of a shortest prog...
Depth is a complexity measure for natural systems of the kind studied in statistical physics and is ...
AbstractThis paper reviews and investigates Bennett's notions of strong and weak computational depth...
AbstractA programming language designed for studies of parallelism and based on Wagner'suniformly re...
Boolean circuits were introduced in complexity theory to provide a model for parallel computation. A...
This paper investigates Bennett\u27s notions of strong and weak computational depth (also called log...
The logical depth with significance b of a string x is the shortest running time of a program for x ...
Torturing an uninformed witness cannot give information about the crime. Leonid Levin [Lev84] Abstra...
AbstractWe introduce Computational Depth, a measure for the amount of “nonrandom” or “useful” inform...
Depth of an object concerns a tradeoff between computation time and excess of pro-gram length over t...
Depth of an object concerns a tradeoff between computation time and excess of program length over th...
Antunes, Fortnow, van Melkebeek and Vinodchandran captured the notion of non-random information by c...
We introduce a general framework for defining the depth of an infinite binary sequence with respect...
The structure and organization of information in binary strings and (infinite) binary sequences are ...
We show that real-value approximations of Kolmogorov-Chaitin complexity K(s) using the algorithmic c...
The logical depth of a reversible Turing machine equals the shortest running time of a shortest prog...
Depth is a complexity measure for natural systems of the kind studied in statistical physics and is ...
AbstractThis paper reviews and investigates Bennett's notions of strong and weak computational depth...
AbstractA programming language designed for studies of parallelism and based on Wagner'suniformly re...
Boolean circuits were introduced in complexity theory to provide a model for parallel computation. A...
This paper investigates Bennett\u27s notions of strong and weak computational depth (also called log...
The logical depth with significance b of a string x is the shortest running time of a program for x ...