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References
J. AZEMA and M. YOR: "En guise d'introduction". Soc. Math. France Astérisque 52–53, 3–16, (1978).
J. AZEMA and M. YOR: "Une solution simple au problème de Skorokhod". Sem. Probab. XIII, Lecture Notes in Mathematics 721, 90–115, Springer (1979).
K. ITO and H.P. Mc KEAN: "Diffusion Processes and their Sample Paths". Springer (1965).
T. JEULIN and M. YOR: "Autour d'un théorème de Ray". Soc. Math. France Astérisque 52–53, 145–158, (1978).
F. KNIGHT: "Random Walks and a sojourn density of Brownian motion". TAMS 109, 56–86, (1963).
N. LEBEDEV: "Special functions and their applications". Prentice Hall (1965).
D. RAY: "Sojourn times of diffusion processes". Ill. Journ. Math. 7, 615–630, (1963).
T. YAMADA and S. WATANABE: "On the uniqueness of solutions of stochastic differential equations". J. Math. Kyoto Univ. 11, 155–167, (1971).
T. SHIGA and S. WATANABE: "Bessel diffusions as a one-parameter family of diffusion processes". Z. für Wahr., 27, 37–46, (1973).
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Mc Gill, P. (1981). A direct proof of the Ray-Knight theorem. In: Azéma, J., Yor, M. (eds) Séminaire de Probabilités XV 1979/80. Lecture Notes in Mathematics, vol 850. Springer, Berlin, Heidelberg. https://doi.org/10.1007/BFb0088369
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DOI: https://doi.org/10.1007/BFb0088369
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