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| Ultima descărcare din IBN: 2022-12-22 16:16 |
 SM ISO690:2012CHEBAN, David. Linear Stochastic Differential Equations and Nonautonomous Dynamical Systems. In: Conference of Mathematical Society of the Republic of Moldova, 28 iunie - 2 iulie 2017, Chişinău. Chişinău: Centrul Editorial-Poligrafic al USM, 2017, 4, pp. 255-258. ISBN 978-9975-71-915-5. |
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| Conference of Mathematical Society of the Republic of Moldova 4, 2017 |
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Conferința "Conference of Mathematical Society of the Republic of Moldova" Chişinău, Moldova, 28 iunie - 2 iulie 2017 | ||||||
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| Pag. 255-258 | ||||||
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We prove that the linear stochastic equation dx(t) = (Ax(t) f(t))dt g(t)dW(t) (*) with linear operator A generating a C0semigroup {U(t)}t_0 and Levitan almost periodic forcing terms f and g admits a unique Levitan almost periodic [3,ChIV] solution in distrution sense if it has at least one precompact solution on R and the semigroup {U(t)}t_0 is asymptotically stable. |
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| Cuvinte-cheie Levitan almost periodic solutions, linear stochastic differential equations |
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