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On the algebraic structure of quantum stochastic calculus

In: Tatra Mountains Mathematical Publications, vol. 10, no. 1
J. Martin Lindsay

Details:

Year, pages: 1997, 281 - 290
About article:
The algebraic structure of the operations of quantum stochastic differentiation are revealed through a matrix/vector formulation of multidimensional quantum stochastic calculus. The efficacy of this point of view is significantly enhanced by the recent discovery of an ample class of quantum semimartingales which is closed under algebraic operations; which consist of stochastically differentiable processes which, together with their stochastic derivatives, are bounded-operator-valued. The wide variety of processes that fit into this class include flows on a $C*$-algebra governed by quantum stochastic differential equations.
How to cite:
ISO 690:
Lindsay, J. 1997. On the algebraic structure of quantum stochastic calculus. In Tatra Mountains Mathematical Publications, vol. 10, no.1, pp. 281-290. 1210-3195.

APA:
Lindsay, J. (1997). On the algebraic structure of quantum stochastic calculus. Tatra Mountains Mathematical Publications, 10(1), 281-290. 1210-3195.