On the existence of an inertial manifold for a deconvolution model of the 2D mean Boussinesq equations

Bisconti Luca; Catania Davide

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On the existence of an inertial manifold for a deconvolution model of the 2D mean Boussinesq equations

机译：关于2D平均Boussinesq方程的解构模型的惯性歧管的存在

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摘要

>We show the existence of an inertial manifold (ie, a globally invariant, exponentially attracting, finite‐dimensional manifold) for the approximate deconvolution model of the 2D mean Boussinesq equations. This model is obtained by means of the Van Cittern approximate deconvolution operators, which is applied to the 2D filtered Boussinesq equations.

机译： >我们显示存在惯性歧管（即，用于2D平均boussinesq方程的近似解卷积模型的惯性歧管（即全局不变，引用，有限的有限歧管）。该模型是通过van Cittern近似解卷积运算符而获得的，该载体施加到2D过滤的Boussinesq方程。

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来源
《Mathematical Methods in the Applied Sciences》 |2018年第13期|共13页
作者
Bisconti Luca; Catania Davide;
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作者单位

Dipartimento di Matematica e Informatica “U. Dini”Università degli Studi di Firenze Via S. Marta 3I‐50139 Florence Italy;

Sezione Matematica (DICATAM)Università degli Studi di Brescia Via Valotti 9I‐25133 Brescia Italy;

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原文格式 PDF
正文语种 eng
中图分类数学;
关键词
Boussinesq equations; deconvolution models; global attractor; inertial manifold; large eddy simulation (LES); Navier‐Stokes equations; turbulent flows;

机译：Boussinesq方程;Deconvolution模型;全球吸引子;惯性歧管;大涡模拟（LES）;Navier-Stokes方程;湍流流动;

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专利

1. On the existence of an inertial manifold for a deconvolution model of the 2D mean Boussinesq equations [J] . Bisconti Luca, Catania Davide Mathematical Methods in the Applied Sciences . 2018,第13期

机译：关于2D平均Boussinesq方程的解构模型的惯性歧管的存在
2. Global Existence and Large Time Asymptotic Behavior of Strong Solution to the Cauchy Problem of 2D Density-Dependent Boussinesq Equations of Korteweg Type [J] . Qi Zhang Advances in Pure Mathematics . 2021,第4期

机译：凯特曲德型2D密度依赖性Boussinesq方程的强大解决方案的全局存在和强度渐近行为
3. On the Existence of Long-Time Classical Solutions for the 2D Inviscid Boussinesq Equations [J] . Jiafa Xu, Lishan Liu Journal of Mathematics . 2021,第a期

机译：关于2D IncIscid Boussinesq方程的长期经典解决方案存在
4. Theoretical and Numerical Aspects for Global Existence and Blow Up for the Solutions to Boussinesq Paradigm Equation [C] . N. Kutev, N. Kolkovska, M. Dimova, International Conference on Application of Mathematics in Technical and Natural Sciences . 2011

机译：全球存在的理论和数值方面，对Boussinesq范式方程解决方案的爆炸
5. Attractors for weakly dissipative equations. Inertial manifolds and normal hyperbolicity. Approximate inertial manifolds of exponential order. [D] . Rosa, Ricardo Martins da Silva. 1996

机译：弱耗散方程的吸引子。惯性流形和正常双曲线。指数级的近似惯性流形。
6. A Unique Finite Element Modeling of the Periodic Wave Transformation over Sloping and Barred Beaches by Beji and Nadaokas Extended Boussinesq Equations [O] . Mohammad Hadi Jabbari, Parviz Ghadimi, Mesbah Sayehbani, 2013

机译：Beji和Nadaoka的扩展Boussinesq方程对倾斜和禁止海滩上的周期波变换的独特有限元建模
7. On the existence of an inertial manifold for a deconvolution model of the 2D mean Boussinesq equations [O] . Bisconti, Luca, Catania, Davide 2017

机译：关于反褶积模型的惯性流形的存在性二维平均Boussinesq方程

On the existence of an inertial manifold for a deconvolution model of the 2D mean Boussinesq equations

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