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commutation
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The answer COMMUTATION has 0 possible clue(s) in existing crosswords.
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The word COMMUTATION is VALID in some board games. Check COMMUTATION in word games in Scrabble, Words With Friends, see scores, anagrams etc.
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Definitions of commutation in various dictionaries:
noun - the travel of a commuter
noun - a warrant substituting a lesser punishment for a greater one
noun - (law) the reduction in severity of a punishment imposed by law
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Keep reading for additional results and analysis below.
| Possible Jeopardy Clues |
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| Executive clemency can lead to this, reducing the severity of a punishment |
| Possible Dictionary Clues |
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| a warrant substituting a lesser punishment for a greater one |
| the travel of a commuter |
| The substitution of one kind of payment for another. |
| Law Reduction of a penalty to a less severe one. |
| Electricity Reversal of current direction. |
| Electricity Conversion of alternating to unidirectional current. |
| The travel of a commuter. |
| The payment substituted. |
| A substitution, exchange, or interchange. |
| Commutation might be related to |
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In mathematics, a commutation theorem explicitly identifies the commutant of a specific von Neumann algebra acting on a Hilbert space in the presence of a trace. The first such result was proved by F.J. Murray and John von Neumann in the 1930s and applies to the von Neumann algebra generated by a discrete group or by the dynamical system associated with a * measurable transformation preserving a probability measure. Another important application is in the theory of unitary representations of unimodular locally compact groups, where the theory has been applied to the regular representation and other closely related representations. In particular this framework led to an abstract version of the Plancherel theorem for unimodular locally compact groups due to Irving Segal and Forrest Stinespring and an abstract Plancherel theorem for spherical functions associated with a Gelfand pair due to Roger Godement. Their work was put in final form in the 1950s by Jacques Dixmier as part of the theory of Hilbert algebras. It was not until the late 1960s, prompted partly by results in algebraic quantum field theory and quantum statistical mechanics due to the school of Rudolf Haag, that the more general non-tracial Tomita–Takesaki theory was developed, heralding a new era in the theory of von Neumann algebras. |