In this paper, we set up the base of the complex probability theory. The following concepts are defined: the axiomatic definition of complex probability; the conditional complex probability; discrete and continuous complex random variables; some distributions of complex random variables. We obtain the addition formula, the multiplication formula, the formula of total probability and the Bayes' formula for complex probability
This article talks about the mathematical foundations of probability theory. Throughout the article,...
Calculus-based introduction to the theory of probability and its applications; axioms of probability...
A discrete formulation of the real-time path integral as the expectation value of a functional of pa...
The Andrey Nikolaevich Kolmogorov's classical system of probability axioms can be extended to encomp...
We discuss possible discretizations of complex analysis and some of their ap-plications to probabili...
Abstract. We present two complex valued probabilistic logics, LCOMPB and LCOMPS, which extend classi...
The calculus of probability is a branch of mathematics. Its foundations have so far not been fully i...
The mathematical probability concept was set forth by Andrey Nikolaevich Kolmogorov in 1933 by layin...
Andrey Kolmogorov put forward in 1933 the five fundamental axioms of classical probability theory. T...
Axiomatic definition of probability spaces. Combinatorial methods. Conditional probability; product ...
After a brief review of ontic and epistemic descriptions, and of subjective, logical and statistical...
Przedstawienie definicji prawdopodobieństwa w ujęciu potocznym i aksjomatycznym. Następnie krótkie p...
Elements of Probability Theory presents the methods of the theory of probability. This book is divid...
We discuss possible discretizations of complex analysis and some of their ap-plications to probabili...
Probability is an important question in the ontological interpretation of quantum mechanics. It has ...
This article talks about the mathematical foundations of probability theory. Throughout the article,...
Calculus-based introduction to the theory of probability and its applications; axioms of probability...
A discrete formulation of the real-time path integral as the expectation value of a functional of pa...
The Andrey Nikolaevich Kolmogorov's classical system of probability axioms can be extended to encomp...
We discuss possible discretizations of complex analysis and some of their ap-plications to probabili...
Abstract. We present two complex valued probabilistic logics, LCOMPB and LCOMPS, which extend classi...
The calculus of probability is a branch of mathematics. Its foundations have so far not been fully i...
The mathematical probability concept was set forth by Andrey Nikolaevich Kolmogorov in 1933 by layin...
Andrey Kolmogorov put forward in 1933 the five fundamental axioms of classical probability theory. T...
Axiomatic definition of probability spaces. Combinatorial methods. Conditional probability; product ...
After a brief review of ontic and epistemic descriptions, and of subjective, logical and statistical...
Przedstawienie definicji prawdopodobieństwa w ujęciu potocznym i aksjomatycznym. Następnie krótkie p...
Elements of Probability Theory presents the methods of the theory of probability. This book is divid...
We discuss possible discretizations of complex analysis and some of their ap-plications to probabili...
Probability is an important question in the ontological interpretation of quantum mechanics. It has ...
This article talks about the mathematical foundations of probability theory. Throughout the article,...
Calculus-based introduction to the theory of probability and its applications; axioms of probability...
A discrete formulation of the real-time path integral as the expectation value of a functional of pa...
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