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**Stochastic differential equations and diffusion processes.
2nd ed.**
*(English)*
Zbl 0684.60040

North-Holland Mathematical Library, 24. Amsterdam etc.: North-Holland; Tokyo: Kodansha Ltd. xvi, 555 p. $ 147.25; Dfl. 280.00 (1989).

The first edition of the book has been extensively reviewed in Zbl 0495.60005. In the mean time it became a world wide known standard reference text from which also a Russian translation appeared (see Zbl 0607.60041). Besides many smaller corrections two chapters are completely new written and a lot of achievements obtained in the mean time are incorporated. The headlines of the new chapters III and V are:

The space of stochastic differentials; Stochastic differential equations with respect to quasimartingales; Moment inequalities for martingales; Some applications of stochastic calculus to Brownian motions; Exponential martingales; Conformal martingales.

Stochastic differential equations on manifolds; Flow of diffeomorphisms; Heat equation on a manifold and horizontal lifts; Non-degenerate diffusions on a manifold and their horizontal lifts; Stochastic parallel displacement and heat equation for tensor fields; The case with boundary conditions; Kähler diffusions; Malliavin’s stochastic calculus of variation for Wiener functionals; Pull-back of Schwartz distributions under Wiener mappings and the regularity of induced measures (probability laws); The case of stochastic differential equations: Applications to heat kernels.

The space of stochastic differentials; Stochastic differential equations with respect to quasimartingales; Moment inequalities for martingales; Some applications of stochastic calculus to Brownian motions; Exponential martingales; Conformal martingales.

Stochastic differential equations on manifolds; Flow of diffeomorphisms; Heat equation on a manifold and horizontal lifts; Non-degenerate diffusions on a manifold and their horizontal lifts; Stochastic parallel displacement and heat equation for tensor fields; The case with boundary conditions; Kähler diffusions; Malliavin’s stochastic calculus of variation for Wiener functionals; Pull-back of Schwartz distributions under Wiener mappings and the regularity of induced measures (probability laws); The case of stochastic differential equations: Applications to heat kernels.

Reviewer: M.Breger

### MSC:

60Hxx | Stochastic analysis |

60J60 | Diffusion processes |

60-02 | Research exposition (monographs, survey articles) pertaining to probability theory |

58J65 | Diffusion processes and stochastic analysis on manifolds |