Bin Zhou

What is he best known for?

The fields of study he is best known for:

• Quantum mechanics
• Control theory
• Electron

Bin Zhou mainly focuses on Control theory, Linear system, Parametric statistics, Lyapunov equation and Applied mathematics. His Control theory research focuses on Lyapunov function, Control system, Actuator, Nonlinear control and Nonlinear system. His biological study spans a wide range of topics, including Numerical integration, Arbitrarily large, Bounded function and State.

In his study, Full state feedback and Consensus is strongly linked to Constant, which falls under the umbrella field of Arbitrarily large. His Lyapunov equation study incorporates themes from Lyapunov redesign, Riccati equation and Small-gain theorem. His Applied mathematics research is multidisciplinary, incorporating elements of Mathematical analysis, Uniformly stable, Sylvester equation, Sylvester matrix and Mathematical optimization.

His most cited work include:

• Blood pressure, cholesterol, and stroke in eastern Asia (422 citations)
• Finite size effects on helical edge states in a quantum spin-hall system (261 citations)
• Finite size effects on helical edge states in a quantum spin-hall system (261 citations)

What are the main themes of his work throughout his whole career to date?

Bin Zhou spends much of his time researching Control theory, Linear system, Bounded function, Applied mathematics and Parametric statistics. His research on Control theory often connects related areas such as Arbitrarily large. He combines subjects such as Control system, Stability, State, Exponential stability and Actuator with his study of Linear system.

As a part of the same scientific family, Bin Zhou mostly works in the field of Bounded function, focusing on Nonlinear system and, on occasion, Free parameter. His research on Applied mathematics also deals with topics like

• Sylvester matrix that connect with fields like Matrix function,
• Sylvester equation which is related to area like Matrix differential equation. His Lyapunov equation research includes elements of Lyapunov redesign and Riccati equation.

He most often published in these fields:

• Control theory (57.79%)
• Linear system (43.73%)
• Bounded function (20.91%)

What were the highlights of his more recent work (between 2016-2021)?

• Control theory (57.79%)
• Linear system (43.73%)
• Bounded function (20.91%)

In recent papers he was focusing on the following fields of study:

Bin Zhou mainly investigates Control theory, Linear system, Bounded function, Applied mathematics and Exponential stability. His Control theory study incorporates themes from Arbitrarily large, State and Free parameter. His Linear system study combines topics in areas such as Control system, State vector, Stability, State and State observer.

His Bounded function study integrates concerns from other disciplines, such as Characteristic equation, Canonical form, Feed forward, Norm and Nonlinear system. His Applied mathematics research is multidisciplinary, incorporating perspectives in Boundary value problem, Lyapunov function, Scalar and Special case. Bin Zhou has researched Control theory in several fields, including Lyapunov equation and Iterative method.

Between 2016 and 2021, his most popular works were:

• NVX-CoV2373 vaccine protects cynomolgus macaque upper and lower airways against SARS-CoV-2 challenge. (57 citations)
• Improved Razumikhin and Krasovskii stability criteria for time-varying stochastic time-delay systems (39 citations)
• Stabilization of Linear Systems with Both Input and State Delays by Observer-Predictors (37 citations)

In his most recent research, the most cited papers focused on:

• Quantum mechanics
• Control theory
• Electron

His primary areas of study are Control theory, Bounded function, Exponential stability, Linear system and Stability. His work carried out in the field of Control theory brings together such families of science as Arbitrarily large and State. His Bounded function research incorporates elements of Canonical form and Nonlinear system.

The concepts of his Nonlinear system study are interwoven with issues in Time complexity, Uniform boundedness, Applied mathematics and Stability conditions. His study in Exponential stability is interdisciplinary in nature, drawing from both Discrete time and continuous time, Numerical stability, Lyapunov function and Stability theory. Bin Zhou interconnects Control system and Lyapunov equation in the investigation of issues within Control theory.

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