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[LECS/QM-10] Working with Representations

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1. Representations in an Inner Product Space

A brief account of representations in a finite dimensional vector spaces is presented. The use of an ortho norrnal basis along with Dirac notation makes all frequently used formula very intuitive. The formulas for representing a vector by a column vector and an operator by matrices are given.  The results  for change of o.n. bases are summarized.


2. Coordinate  and Momentum Representations

 The choice of orthonormal basis of eigenvectors of position operator gives rise to the coordinate representation. The wave function, being the expansion coefficient of state vector in this basis, gives the probability amplitude for  outcomes of position measurements.In the coordinate representation the momentum  operator assumes a simple form \(\widehat{p} =-i\hbar \dd{x}\).


3.  Momentum Representation and its Connectiion with Coordinate Representation

The momentum representation is defined and its  connection with  the coordinate  representations is discussed. The transformation bewteen the two is effected by \(\innerproduct{x}{p}\) which are just the momentum eigenfunctions in the coordinate representation. Delta function normalization and the box normalization is discussed for the momentum eigenfunctions.


4, A Summary of Coordinate and Momentum Representation

A tabular summary of  coordinate and momentum representations is presented.


 

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