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Table des matières de ce fascicule | Article précédent | Article suivant
Waldenfels, Wilhelm von
Continuous Maassen kernels and the inverse oscillator. Séminaire de probabilités de Strasbourg, 30 (1996), p. 117-161
Texte intégral djvu | pdf | Analyses MR 1459481 | Zbl 0856.60068
URL stable: http://www.numdam.org/item?id=SPS_1996__30__117_0
[1] Belavkin, V.P.: A quantum non adapted Ito formula and non stationary evolution in Fock scale. Quantum probability and applications. VI, p. 137-180. World Scientific (Singapore) (1992) MR 1140634 | Zbl 0937.60045
[2] Glauber, R.J.: Amplifiers, Attenuators and the Quantum Theory of Measurement. In Frontiers in Quantum Optics, ed. by E.R. Pike and S. Sarkar, Vol. X of Malveru Physics Theories (Adam Hilger), Bristol, 1986. MR 943859
[3] Haake, F., Walls, D.F.: Overdamped and Amplifying Meters in the Quantum Theory of Measurement. Phys. Rev. A. 36 (1987), p. 730-739. MR 901719
[4] Hepp, K., Lieb, E.H.: Phase Transitions in Reservoirdriven Open Systems with Applications to Lasers and Superconductors. Helv. Phys. Acta. 46 (1973), p. 573-603.
[5] Hudson, R.L., Parthasarathy, K.R.: Construction of Quantum Diffusions. Lecture Notes in Mathematics 1055, Springer (1984), p. 173-205. MR 782904 | Zbl 0542.60053
[6] Lindsay, J.M.: Quantum and non-causal stochastic calculus. Prob. Theory Relat. Fields 97, (1993), p. 65-80. Zbl 0794.60052
[7] Lindsay, J.M., Maassen, H.: The Stochastic Calculus of Bose Noise. Preprint, Nijmwegen (1988). MR 985820
[8] Lindsay, M., Maassen, H.: An Integral Kernel Approach to Noise. Lecture Notes in Mathematics 1303, Springer (1988), p. 192-208. MR 985820 | Zbl 0652.60068
[9] Maassen, H.: Quantum Markov Processes on Fock Space Described by Integral Kernels. Lecture Notes in Mathematics 1136, Springer (1985), p. 361-374. MR 819517
[10] Meyer, P.A.: Quantum Probability for Probabilists. Lecture Notes in Mathematics1538, Springer (1993). MR 1222649 | Zbl 0773.60098
[11] Palma, G.M., Vaglica, A., Leonardi, C., De Oliveira, F.A.M., Knight, P.L.: Effects of Broadband Squeezing on the Quantum Onset of Superradiance. Optics Communications, 79 (1990), p. 377-380.
[12] Robinson, P., Maassen, H.: Quantum Stochastic Calculus and the Dynamical Stark Effect. Reports an Math. Phys. Vol. 30 (1991). MR 1188395 | Zbl 0756.60102
[13] Waldenfels, W.v.: Spontaneous Light Emission Described by a Quantum Stochastic Differential Equation. Lecture Notes in Mathematics 1136, Springer (1985), p. 515-534. MR 819530 | Zbl 0569.60059
[14] Waldenfels, W.v.: The Inverse Oscillator in a Heat Bath as a Quantum Stochastic Process. Preprint 630. 1991. SFB 123 (Heidelberg).
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