Dirac–von Neumann axioms mathematical physics , the Dirac–von Neumann axioms give a mathematical formulation of quantum mechanics in terms of operators on a Hilbert space . They were introduced by Paul Dirac in 1930 and John von Neumann in 1932.Hilbert space formulation The space is a fixed complex Hilbert space of countable infinite dimension .The bounded observables of the quantum mechanical system are defined to be the self-adjoint elements of the C* algebra. The states of the quantum mechanical system are defined to be the states of the C* algebra. The value of a state on an element is the expectation value of the observable if the quantum system is in the state.Example bounded operators on a Hilbert space, then the bounded observables are just the bounded self-adjoint operators on. If is a unit vector of then is a state on the C* algebra, meaning the unit vectors give the states of the system . This is similar to Dirac's formulation of quantum mechanics , though Dirac also allowed unbounded operators, and did not distinguish clearly between self-adjoint and Hermitian operators .
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