Ito’s formula and Levy’s Laplacian

Kimiaki Saito

doi:10.1017/S0027763000002658

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The class of normal functionals

is, as is well known, adapted to the domain of Lévy’s Laplacian and plays important roles in the works by P. Lévy and T. Hida (cf. [1], [2] and [8]), where Bx denotes one-dimensional parameter white noise and denotes the renormalization of

References

[ 1 ] Hida, T., Brownian motion in Applications of Mathematics 11, Springer-Verlag (1980).Google Scholar

[ 2 ] Hida, T., Brownian motion and its functionals, Ricerche di Matematica, Vol. XXXIV, fase, I° (1985).Google Scholar

[ 3 ] Hille, E. and Phillips, R. S., Functional Analysis and Semi-groups, Colloq. Publ. Amer. Math. Soc., (1957).Google Scholar

[ 4 ] Itô, K., Foundations of stochastic differential equations in infinite dimensional spaces, CBMS-NSF Regional Conference Series in Applied Math., 47 (1984).Google Scholar

[ 5 ] Kubo, I., Ito formula for generalized Brownian functionals, Lecture Notes in Control and Information Science, 49 (1983), 156–166.Google Scholar

[ 6 ] Kubo, I. and Takenaka, S., Calculus on Gaussian white noise, I-IV Proc. Japan Acad., 56A (1980), 376–380, 411–416, 57A (1981), 433–437, 58A (1982), 186–189.Google Scholar

[ 7 ] Kuo, H.-H., On Laplacian operators of generalized Brownian functionals, Lecture Notes in Mathematics, 1203, Springer-Verlag (1986), 119–128.Google Scholar

[ 8 ] Levy, P., Problèmes concret d’analyse fonctionnelle, Gauthier-Villars (1951).Google Scholar

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This article has been cited by the following publications. This list is generated based on data provided by Crossref.

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Saito, Kimiaki 1991. Ito’s formula and Levy’s Laplacian II. Nagoya Mathematical Journal, Vol. 123, Issue. , p. 153.

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CHUNG, DONG MYUNG JI, UN CIG and SAITÔ, KIMIAKI 1999. CAUCHY PROBLEMS ASSOCIATED WITH THE LÉVY LAPLACIAN IN WHITE NOISE ANALYSIS. Infinite Dimensional Analysis, Quantum Probability and Related Topics, Vol. 02, Issue. 01, p. 131.

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ACCARDI, LUIGI JI, UN CIG and SAITÔ, KIMIAKI 2013. THE EXOTIC (HIGHER ORDER LÉVY) LAPLACIANS GENERATE THE MARKOV PROCESSES GIVEN BY DISTRIBUTION DERIVATIVES OF WHITE NOISE. Infinite Dimensional Analysis, Quantum Probability and Related Topics, Vol. 16, Issue. 03, p. 1350020.

Accardi, Luigi Hasegawa, Ai Ji, Un Cig and Saitô, Kimiaki 2020. White noise delta functions and infinite-dimensional Laplacians. Infinite Dimensional Analysis, Quantum Probability and Related Topics, Vol. 23, Issue. 04, p. 2050028.

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