Quasi-commutative property mathematics , the quasi-commutative property is an extension or generalization of the general commutative property . This property is used in specific applications with various definitions .Two matrices p and q are said to have the commutative property whenever follows . Given two non-commutable matrices x and y satisfy the quasi-commutative property whenever z satisfies the following properties:the matrix mechanics introduced by Heisenberg as a version of quantum mechanics . In this mechanics, p and q are infinite matrices corresponding respectively to the momentum and position variables of a particle . These matrices are written out at Matrix mechanics#Harmonic oscillator, and z = iħ times the infinite unit matrix , where ħ is the reduced Planck constant .A function f , defined as follows:for all and for all,
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