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Search Results: 1 - 10 of 5581 matches for " Delin Chu "
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Impulsive Fixed Mode in Singular Decentralized Control Systems
广义分散控制系统脉冲固定模

Chu Delin,
储德林

自动化学报 , 1993,
Abstract: Recently, 1] studied the impulsive fixed mode in singular decentralized control systems and gave some existence theorems. The purpose of this paper is to revise an unsuitable viewpoint and give a strict proof for those existence theorems.
Sparse Kernel Canonical Correlation Analysis
Delin Chu,Li-Zhi Liao,Michael K. Ng,Xiaowei Zhang
Lecture Notes in Engineering and Computer Science , 2013,
Abstract:
Finite Dimensional Uniform Attractors for the Nonautonomous Camassa-Holm Equations
Delin Wu
Abstract and Applied Analysis , 2009, DOI: 10.1155/2009/952657
Abstract: We consider the uniform attractors for the three-dimensional nonautonomous Camassa-Holm equations in the periodic box Ω=[0,]3. Assuming =(,)∈2loc((0,);(?1/2)), we establish the existence of the uniform attractors in (1/2) and (). The fractal dimension is estimated for the kernel sections of the uniform attractors obtained.
The Pullback Attractors for the Nonautonomous Camassa-Holm Equations
Delin Wu
Mathematical Problems in Engineering , 2009, DOI: 10.1155/2009/390805
Abstract: We consider the pullback attractors for the three-dimensional nonautonomous Camassa-Holm equations in the periodic box Ω=[0,]3. Assuming ∈2loc((0,);(?1/2)), which is translation bounded, the existence of the pullback attractor for the three-dimensional nonautonomous Camassa-Holm system is proved in (1/2) and ().
On the Dimension of the Pullback Attractors for g-Navier-Stokes Equations
Delin Wu
Discrete Dynamics in Nature and Society , 2010, DOI: 10.1155/2010/893240
Abstract: We consider the asymptotic behaviour of nonautonomous 2D g-Navier-Stokes equations in bounded domain Ω. Assuming that ∈2loc, which is translation bounded, the existence of the pullback attractor is proved in 2(Ω) and 1(Ω). It is proved that the fractal dimension of the pullback attractor is finite.
The Finite-Dimensional Uniform Attractors for the Nonautonomous g-Navier-Stokes Equations
Delin Wu
Journal of Applied Mathematics , 2009, DOI: 10.1155/2009/150420
Abstract: We consider the uniform attractors for the two dimensional nonautonomous g-Navier-Stokes equations in bounded domain Ω. Assuming =(,)∈2loc, we establish the existence of the uniform attractor in 2(Ω) and (1/2). The fractal dimension is estimated for the kernel sections of the uniform attractors obtained.
The Uniform Attractors for the Nonhomogeneous 2D Navier-Stokes Equations in Some Unbounded Domain
Delin Wu
Boundary Value Problems , 2008, DOI: 10.1155/2008/831746
Abstract: We consider the attractors for the two-dimensional nonautonomous Navier-Stokes equations in some unbounded domain with nonhomogeneous boundary conditions. We apply the so-called uniformly ‰-limit compact approach to nonhomogeneous Navier-Stokes equation as well as a method to verify it. Assuming f ¢ Lloc2((0,T);L2( )), which is translation compact and ¢ Cb1( ¢ +;H2( ¢ 1 —{ ±L})) asymptotically almost periodic, we establish the existence of the uniform attractor in H1( ).
The Uniform Attractors for the Nonhomogeneous 2D Navier-Stokes Equations in Some Unbounded Domain
Wu Delin
Boundary Value Problems , 2008,
Abstract: We consider the attractors for the two-dimensional nonautonomous Navier-Stokes equations in some unbounded domain with nonhomogeneous boundary conditions. We apply the so-called uniformly -limit compact approach to nonhomogeneous Navier-Stokes equation as well as a method to verify it. Assuming , which is translation compact and asymptotically almost periodic, we establish the existence of the uniform attractor in ( ).
The Exponential Attractors for the g-Navier-Stokes Equations
Delin Wu,Jicheng Tao
Journal of Function Spaces and Applications , 2012, DOI: 10.1155/2012/503454
Abstract: We consider the exponential attractors for the two-dimensional g-Navier-Stokes equations in bounded domain Ω. We establish the existence of the exponential attractor in L2(Ω).
The Sensor Web: A Macro-Instrument for Coordinated Sensing
Kevin A. Delin
Sensors , 2002, DOI: 10.3390/s20700270
Abstract: The Sensor Web is a macro-instrument concept that allows for the spatiotemporal understanding of an environment through coordinated efforts between multiple numbers and types of sensing platforms, including both orbital and terrestrial and both fixed and mobile. Each of these platforms, or pods, communicates within their local neighborhood and thus distributes information to the instrument as a whole. Much as intelligence in the brain is a result of the myriad of connections between dendrites, it is anticipated that the Sensor Web will develop a macro-intelligence as a result of its distributed information with the pods reacting and adapting to their environment in a way that is much more than their individual sum. The sharing of data among individual pods will allow for a global perception and purpose of the instrument as a whole. The Sensor Web is to sensors what the Internet is to computers, with different platforms and operating systems communicating via a set of shared, robust protocols. This paper will outline the potential of the Sensor Web concept and describe the Jet Propulsion Laboratory (JPL) Sensor Webs Project (http://sensorwebs.jpl.nasa.gov/). In particular, various fielded Sensor Webs will be discussed.
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