Probability theory is the mathematical study of probability.

Mathematicians and actuaries think of probabilities as numbers in the closed interval from 0 to 1 assigned to "events" whose occurrence or failure to occur is random. Probabilities $P(A)$ are assigned to events $A$ according to the probability axioms.

The probability that an event $A$ occurs given the known occurrence of an event $B$ is the conditional probability of $A$ given $B$; its numerical value is $P(A\; \backslash cap\; B)/P(B)$ (as long as $P(B)$ is nonzero). If the conditional probability of $A$ given $B$ is the same as the ("unconditional") probability of $A$, then $A$ and $B$ are said to be independent events. That this relation between $A$ and $B$ is symmetric may be seen more readily by realizing that it is the same as saying $P(A\; \backslash cap\; B)\; =\; P(A)P(B)$ when A and B are independent events.

Two crucial concepts in the theory of probability are those of a random variable and of the probability distribution of a random variable; see those articles for more information.

A somewhat more abstract view of probability

Mathematicians usually take probability theory to be the study of probability spaces and random variables — an approach introduced by Kolmogorov in the 1930s. A probability space is a triple $(\backslash Omega,\; \backslash mathcal\; F,\; P)$, where

• $\backslash Omega$ is a non-empty set, sometimes called the "sample space", each of whose members is thought of as a potential outcome of a random experiment. For example, if 100 voters are to be drawn randomly from among all voters in California and asked whom they will vote for governor, then the set of all sequences of 100 Californian voters would be the sample space Ω.

• $\backslash mathcal\; F$ is a σ-algebra of subsets of $\backslash Omega$ - its members are called "events". For example the set of all sequences of 100 Californian voters in which at least 60 will vote for Schwarzenegger is identified with the "event" that at least 60 of the 100 chosen voters will so vote. To say that $\backslash mathcal\; F$ is a σ-algebra implies per definition that it contains $\backslash Omega$, that the complement of any event is an event, and that the union of any (finite or countably infinite) sequence of events is an event.

• $P$ is a probability measure on $\backslash mathcal\; F$, i.e., a measure such that $P(\backslash Omega)=1$.

It is important to note that $P$ is a function defined on $\backslash mathcal\; F$ and not on $\backslash Omega$, and often not on the complete powerset $\backslash mathcal\; F=\backslash mathbb\; P\; (\backslash Omega)$ either. Not every set of outcomes is an event.

If $\backslash Omega$ is denumerable we almost always define $\backslash mathcal\; F$ as the power set of $\backslash Omega$, i.e $\backslash mathcal\; F=\backslash mathbb\; P\; (\backslash Omega)$ which is trivially a σ-algebra and the biggest one we can create using $\backslash Omega$. In a discrete space we can therefore omit $\backslash mathcal\{F\}$ and just write $(\backslash Omega,\; P)$ to define it. If on the other hand $\backslash Omega$ is non-denumerable and we use $\backslash mathcal\; F=\backslash mathbb\; P\; (\backslash Omega)$ we get into trouble defining our probability measure $P$ because $\backslash mathcal\{F\}$ is too 'huge', i.e. there will often be sets to which it will be impossible to assign a unique measure, giving rise to problems like the Banach–Tarski paradox. So we have to use a smaller σ-algebra $\backslash mathcal\; F$ (e.g. the Borel algebra of $\backslash Omega$, which is the smallest σ-algebra that makes all open sets measurable).

A random variable $X$ is a measurable function on $\backslash Omega$. For example, the number of voters who will vote for Schwarzenegger in the aforementioned sample of 100 is a random variable.

If $X$ is any random variable, the notation $P(X\; \backslash ge\; 60)$, is shorthand for $P(\backslash \{\; \backslash omega\; \backslash in\; \backslash Omega\; \backslash mid\; X(\backslash omega)\; \backslash ge\; 60\; \backslash \})$, assuming that "$X\; \backslash ge\; 60$" is an "event".

For an algebraic alternative to Kolmogorov's approach, see algebra of random variables.

Philosophy of application of probability

There are different ways to interpret probability. Frequentists will assign probabilities only to events that are random, i.e., random variables, that are outcomes of actual or theoretical experiments. On the other hand, Bayesians assign probabilities to propositions that are uncertain according either to subjective degrees of belief in their truth, or to logically justifiable degrees of belief in their truth. Among statisticians and philosophers, many more distinctions are drawn beyond this subjective/objective divide. See the article on interpretations of probability at the Stanford Encyclopedia of Philosophy: ^*.

A Bayesian may assign a probability to the proposition that 'there was life on Mars a billion years ago,' since that is uncertain, whereas a frequentist would not assign probabilities to statements at all. A frequentist is actually unable to technically interpret such uses of the probability concept, even though 'probability' is often used in this way in colloquial speech. Frequentists only assign probabilities to outcomes of well defined random experiments, that is, where there is a defined sample space as defined above in the theory section. For another illustration of the differences see the two envelopes problem.

See also

• probabilistic logic
• credence (probability theory)
• glossary of probability and statistics
• list of probability topics
• list of statistical topics
• list of publications in statistics
• predictive modelling
• fuzzy measure theory
• probability axioms
• probability distribution
• expected value
• likelihood function
• random variable
• sample space
• variance
• statistical independence
• notation in probability
• possibility theory
• Pierre de Fermat
• Blaise Pascal

Bibliography

• Pierre Simon de Laplace (1812) Analytical Theory of Probability

The first major treatise blending calculus with probability theory, originally in French: Theorie Analytique des Probabilités.

• Andrei Nikolajevich Kolmogorov (1950) Foundations of the Theory of Probability

The modern measure-theoretic foundation of probability theory; the original German version (Grundbegriffe der Wahrscheinlichkeitrechnung) appeared in 1933.

• Harold Jeffreys (1939) The Theory of Probability

An empiricist, Bayesian approach to the foundations of probability theory.

• Edward Nelson (1987) Radically Elementary Probability Theory

Discrete foundations of probability theory, based on nonstandard analysis and internal set theory. downloadable. http://www.math.princeton.edu/~nelson/books.html

• Patrick Billingsley: Probability and Measure, John Wiley and Sons, New York, Toronto, London, 1979.

• Henk Tijms (2004) Understanding Probability

A lively introduction to probability theory for the beginner, Cambridge Univ. Press.

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