Equipossibility

Equipossibility is a philosophical concept in possibility theory that is a precursor to the notion of equiprobability in probability theory. It is used to distinguish what can occur in a probability experiment. For example, when considering rolling a six-sided die, why do we typically view the possible outcomes as {1,2,3,4,5,6} rather than, say, {6, not 6}? The former set contains equally possible alternatives, while the latter does not because there are five times as many alternatives inherent in 'not 6' as in 6. This is true even if the die is biased so that 6 and 'not 6' are equally likely to occur.

By the Principle of Indifference of Laplace, equipossible alternatives may be accorded equal probabilities if nothing more is known about the underlying probability distribution.

It is a matter of contention whether the concept of equipossibility, also called equispecificity (from equispecific), can truly be distinguished from the concept of equiprobability.

In Bayesian inference, a widely used definition of equipossibility is "a transformation group which leaves invariant one's state of knowledge". Equiprobability is then defined by normalizing the Haar measure of this symmetry group. This is known as the principle of transformation groups.

References

External links

Book Chapter by Henry E. Kyburg Jr. on equipossibility, with the 6/not-6 example above
Quotes on equipossibility in classical probability

This article is issued from Wikipedia - version of the 3/23/2013. The text is available under the Creative Commons Attribution/Share Alike but additional terms may apply for the media files.