Stochastic Navier–Stokes equations perturbed by Lévy noise with hereditary viscosity
2019 ◽
Vol 22
(01)
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pp. 1950006
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In this paper, we study the stochastic Navier–Stokes equations (SNSE) perturbed by Lévy noise in three dimensions with a hereditary viscous term which depends on the past history. We establish the local solvability of the Cauchy problem for such systems. The local monotonicity property of the nonlinear term of the cutoff problem and a stochastic generalization of the Minty–Browder technique are exploited in the proofs. Finally, we show that the global solvability results hold under smallness condition on the initial data and suitable assumptions on the noise coefficients.
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2019 ◽
Vol 99
(2)
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pp. 344-345
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2020 ◽
Vol 489
(2)
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pp. 124182
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2012 ◽
Vol 1
(2)
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pp. 355-392
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2018 ◽
Vol 292
(5)
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pp. 1056-1088
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2009 ◽
Vol 52
(7)
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pp. 1497-1524
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2020 ◽
Vol 492
(1)
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pp. 124404
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2017 ◽
Vol 6
(3)
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pp. 409-425
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