R. L. Hudson scite author profile

Abstract. Using only the Boson canonical commutation relations and the Riemann-Lebesgue integral we construct a simple theory of stochastic integrals and differentials with respect to the basic field operator processes. This leads to a noncommutative Ito product formula, a realisation of the classical Poisson process in Fock space which gives a noncommutative central limit theorem, the construction of solutions of certain noncommutative stochastic differential equations, and finally to the integration of certain irreversible equations of motion governed by semigroups of completely positive maps. The classical Ito product formula for stochastic differentials with respect to Brownian motion and the Poisson process is a special case.

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When is the wigner quasi-probability density non-negative?

Hudson

1974

Reports on Mathematical Physics

556

365

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Locally normal symmetric states and an analogue of de Finetti's theorem

Hudson

Moody

1976

Z. Wahrscheinlichkeitstheorie verw Gebiete

149

194

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A quantum-mechanical central limit theorem

Cushen

Hudson

1971

Journal of Applied Probability

136

107

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The concepts of distribution operator, stochastic independence, convergence in distribution and normal distribution are formulated for pairs of canonically conjugate quantum-mechanical momentum and position operators. It is shown that if the sequence (pn, qn), n = 1, 2, ··· is stochastically independent and identically distributed with finite covariance and zero mean then the sequence of pairs of canonical observables converges in distribution to a normal limit distribution.

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Fermion Ito's formula and stochastic evolutions

1984

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R. L. Hudson

Quantum Ito's formula and stochastic evolutions

When is the wigner quasi-probability density non-negative?

Locally normal symmetric states and an analogue of de Finetti's theorem

A quantum-mechanical central limit theorem

Fermion Ito's formula and stochastic evolutions

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