We provide three steps in the direction of shifting probability from a descriptive tool of unpredictable events to a way of understanding them. At a very elementary level we state an operational definition of probability based solely on symmetry assumptions about observed data. This definition converges, however, to the Kolmogorov one within a special large number law fashion that represents a first way of twisting features observed in the data with properties expected in the next observations. Within this probability meaning we fix a general sampling mechanism to generate random variables and extend our twisting device to computing probability distributions on population properties on the basis of the likelihood of the observed features. H...
Quantum states are the ultimate criterion to produce sequences of random numbers. Spatially spread e...
This document contains lecture notes of an introductory course on Kolmogorov complexity. They cover ...
The study of random objects is a useful one in many applications and areas of mathematics. Randomnes...
Early work on the frequency theory of probability made extensive use of the notion of randomness, co...
In contrast to statistical entropy which measures the quantity of information in an average object ...
In this paper, we analyze the problem of prediction in physics from the computational viewpoint. We ...
Although information content is invariant up to an additive constant, the range of possible additive...
The article further develops Kolmogorov's algorithmic complexity theory. The definition of randomnes...
Most practical applications of statistical methods are based on the implicit assumption that if an e...
A leading idea is to apply techniques from verification and programming theory to machine learning a...
This thesis focuses on applications of classical tools from probability theory and convex analysis s...
By flipping a coin repeatedly and recording the result, we can create a sequence that intuitively is...
Andrey Kolmogorov put forward in 1933 the five fundamental axioms of classical probability theory. T...
Abstract. Symmetry of information establishes a relation between the information that x has about y ...
Physicists usually assume that events with a very small probability cannot occur. Kolmogorov complex...
Quantum states are the ultimate criterion to produce sequences of random numbers. Spatially spread e...
This document contains lecture notes of an introductory course on Kolmogorov complexity. They cover ...
The study of random objects is a useful one in many applications and areas of mathematics. Randomnes...
Early work on the frequency theory of probability made extensive use of the notion of randomness, co...
In contrast to statistical entropy which measures the quantity of information in an average object ...
In this paper, we analyze the problem of prediction in physics from the computational viewpoint. We ...
Although information content is invariant up to an additive constant, the range of possible additive...
The article further develops Kolmogorov's algorithmic complexity theory. The definition of randomnes...
Most practical applications of statistical methods are based on the implicit assumption that if an e...
A leading idea is to apply techniques from verification and programming theory to machine learning a...
This thesis focuses on applications of classical tools from probability theory and convex analysis s...
By flipping a coin repeatedly and recording the result, we can create a sequence that intuitively is...
Andrey Kolmogorov put forward in 1933 the five fundamental axioms of classical probability theory. T...
Abstract. Symmetry of information establishes a relation between the information that x has about y ...
Physicists usually assume that events with a very small probability cannot occur. Kolmogorov complex...
Quantum states are the ultimate criterion to produce sequences of random numbers. Spatially spread e...
This document contains lecture notes of an introductory course on Kolmogorov complexity. They cover ...
The study of random objects is a useful one in many applications and areas of mathematics. Randomnes...