This thesis establishes significant new results in the area of algorithmic randomness. These results elucidate the deep relationship between randomness and computability. A number of results focus on randomness for finite strings. Levin introduced two functions which measure the randomness of finite strings. One function is derived from a universal monotone machine and the other function is derived from an optimal computably enumerable semimeasure. Gacs proved that infinitely often, the gap between these two functions exceeds the inverse Ackermann function (applied to string length). This thesis improves this result to show that infinitely often the difference between these two functions exceeds the double logarithm. Another separation resu...
Abstract. In the theory of algorithmic randomness, several notions of random sequence are defined vi...
Schnorr randomness is a randomness notion based on Brouwer's concept of a "constructive null set." ...
AbstractWe study algorithmic randomness and monotone complexity on product of the set of infinite bi...
This thesis establishes significant new results in the area of algorithmic randomness. These results...
In this paper we apply some elementary computability-theoretic notions to algorithmic complexity the...
AbstractIn this paper we apply some elementary computability-theoretic notions to algorithmic comple...
Algorithmic randomness uses computability theory to define notions of randomness for infinite object...
This thesis establishes results in several different areas of computability theory. The first chapt...
AbstractThere are two fundamental computably enumerable sets associated with any Kolmogorov complexi...
Abstract. Different approaches have been taken to defining random-ness for non-computable probabilit...
By flipping a coin repeatedly and recording the result, we can create a sequence that intuitively is...
In this dissertation we consider two different notions of randomness and their applica-tions to prob...
AbstractFollowing a suggestion of Zvonkin and Levin, we generalize Martin-Löf’s definition of infini...
In this dissertation we consider two different notions of randomness and their applications to probl...
Abstract. We compare various notions of algorithmic randomness. First we consider relativized random...
Abstract. In the theory of algorithmic randomness, several notions of random sequence are defined vi...
Schnorr randomness is a randomness notion based on Brouwer's concept of a "constructive null set." ...
AbstractWe study algorithmic randomness and monotone complexity on product of the set of infinite bi...
This thesis establishes significant new results in the area of algorithmic randomness. These results...
In this paper we apply some elementary computability-theoretic notions to algorithmic complexity the...
AbstractIn this paper we apply some elementary computability-theoretic notions to algorithmic comple...
Algorithmic randomness uses computability theory to define notions of randomness for infinite object...
This thesis establishes results in several different areas of computability theory. The first chapt...
AbstractThere are two fundamental computably enumerable sets associated with any Kolmogorov complexi...
Abstract. Different approaches have been taken to defining random-ness for non-computable probabilit...
By flipping a coin repeatedly and recording the result, we can create a sequence that intuitively is...
In this dissertation we consider two different notions of randomness and their applica-tions to prob...
AbstractFollowing a suggestion of Zvonkin and Levin, we generalize Martin-Löf’s definition of infini...
In this dissertation we consider two different notions of randomness and their applications to probl...
Abstract. We compare various notions of algorithmic randomness. First we consider relativized random...
Abstract. In the theory of algorithmic randomness, several notions of random sequence are defined vi...
Schnorr randomness is a randomness notion based on Brouwer's concept of a "constructive null set." ...
AbstractWe study algorithmic randomness and monotone complexity on product of the set of infinite bi...