Boundedness, almost periodicity and stability of certain Navier-Stokes flows in unbounded domains
[摘要] We investigate the existence, uniqueness and stability of bounded and almost periodic mild solutions to several Navier-Stokes flow problems. In our strategy, we propose a general framework for studying the semi-linear evolution equations with certain smoothing properties of the linear part and with the local Lipschitz continuity of the nonlinear operator. Our method is based on interpolation functors combined with differential inequalities. Our abstract results are applied to Navier-Stokes-Oseen equations describing flows of incompressible viscous fluid passing a translating and rotating obstacle and to Navier Stokes equations on aperture domains and/or in Besov spaces. (C) 2017 Elsevier Inc. All rights reserved.
[发布日期] 2017-12-15 [发布机构]
[效力级别] [学科分类]
[关键词] Bounded solutions and stability;Almost periodicity;Navier-Stokes-Oseen equations;Navier-Stokes flows in Besov Spaces;Oseen operator;Stokes operator [时效性]