Non-commutative probability and non-commutative processes
Abstract
A probability space is a pair (A,φ ) where A is an algebra and φ a state on the algebra. In classical probability A is the algebra of linear combinations of indicator functions on the sample space and in quantum probability A is the Heisenberg or Clifford algebra. However, other algebras are of interest in non-commutative probability. Here one discusses some other non-commutative probability spaces, in particular those associated to non-commutative space-time.
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