Infinite matrices may violate the associative law
classification
🪐 quant-ph
keywords
associativedefinedinfinitematricesorderbecausecubecurious
read the original abstract
The momentum operator for a particle in a box is represented by an infinite order Hermitian matrix $P$. Its square $P^2$ is well defined (and diagonal), but its cube $P^3$ is ill defined, because $P P^2\neq P^2 P$. Truncating these matrices to a finite order restores the associative law, but leads to other curious results.
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