Geodesic
Inverse local times, positive sojourns, and maxima for Brownian motion
Colloque Paul Lévy sur les processus stochastiques, Astérisque, no. 157-158 (1988), pp. 233-247

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Knight, Frank B. Inverse local times, positive sojourns, and maxima for Brownian motion, dans Colloque Paul Lévy sur les processus stochastiques, Astérisque, no. 157-158 (1988), pp. 233-247. http://geodesic.mathdoc.fr/item/AST_1988__157-158__233_0/
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     title = {Inverse local times, positive sojourns, and maxima for {Brownian} motion},
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1. Ph. Biane, J. F. Le Gall, M. Yor. Un processus qui ressemble au pont brownian. Seminarie de Probabilités XXI. Lecture Notes in Math. 1247, Springer, 1987. | DOI | Zbl | Numdam

2. K. L. Chung. Excursions in Brownian motion. Arkiv för matematik 14, #2(1976). pp. 155-177. | Zbl | DOI

3. Z. Ciesielski and S. J. Taylor. First passage and sojourn times for Brownian motion in space and the exact Hansdorff measure of the sample path. T.A.M.S. 103. #3(1962), pp. 434-450. | Zbl | DOI

4. J. L. Doob. Henristic approach to the Kolmogorov-Smirnov theorems. The Annals of Math. Statistics XX, #3(1949), pp. 393-403. | Zbl | DOI

5. K. Ito and H. P. Mckean, Jr. Diffusion Processes and their Sample Paths. Academic Press (1965), N.Y. | Zbl

6. F. B. Knight. Brownian local times and taboo processes. T.A.M.S. 143(1969). pp. 173-185. | Zbl | DOI

7. F. B. Knight. Essentials of Brownian Motion and Diffusion. Mathematical Surveys #18. Amer. Math. Society (1981). Providence, RI. | Zbl

8. P. Lévy. Le mouvement Brownien plan. American Jour. Math. 62, #3(1940), pp. 487-550. | JFM | Zbl | DOI

9. P. Lévy. Processus Stochastique et Mouvement Brownien. Gauthier-Villars (1948), Paris. | Zbl

10. P. Lévy. Wiener's random function, and other Laplacian random functions. Proceedings of the 2nd Berkeley Symposium on Math. Statistics and Probability (1951), Univ. of California Press. pp. 171-188. | Zbl

11. G. Louchard. Kac's formula, Lévy's local time, and Brownian excursion. J. Appl. Prob. 21(1984). pp. 479-499. | Zbl | DOI

12. E. Montroll. Markov chains and quantum theory. Comm. on Pure and Appl. Math. V(1952). pp. 415-453. | Zbl | DOI

13. D. Ray. Sojourn times of diffusion processes. Illinois J. Math. 7(1963). 615-630. | Zbl

14. L. C. G. Rogers. Williams' characterization of the Brownian excursion law: proof and applications. Seminaire de Probabilités XV. Lecture Notes in Math. 850. Springer. 1981. | DOI | Zbl | EuDML | Numdam