I got this doubt while reading matrix representation of operators in Quantum Mechanics. And it left me wondering whether we can represent any general diagonalizable matrix in the eigenvalue basis of another matrix. If so can you please suggest me any material to study about this method
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2Sorry, can you be a little more specific about what you're confused about? You can always represent any operator by a matrix in any basis. – jgon Sep 06 '19 at 16:51
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This question doesn't make sense as stated. – copper.hat Sep 06 '19 at 16:52
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Yes, that exactly is my doubt. I don't know how to represent any matrix in an arbitary basis. I just want to know the method by which we can perform the above operation – RAJU C Sep 06 '19 at 16:52
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Have you tried searching the Web for “change of basis?” – amd Sep 06 '19 at 18:45
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Thanks I just did – RAJU C Sep 07 '19 at 04:20