Seung-Yeal Ha

What is he best known for?

The fields of study he is best known for:

• Quantum mechanics
• Mathematical analysis
• Geometry

His primary areas of investigation include Mathematical analysis, Statistical physics, Kuramoto model, Flocking and Classical mechanics. The study incorporates disciplines such as Lyapunov functional, Unitary group, Phase synchronization and Relaxation in addition to Mathematical analysis. His Lyapunov functional research integrates issues from Mean field limit and Vlasov equation.

He combines subjects such as Particle velocity, Complex system, Upper and lower bounds and Self-organization with his study of Statistical physics. His Flocking study combines topics in areas such as Applied mathematics, Differential inequalities, Control theory and Particle model. His research in Classical mechanics tackles topics such as Compressibility which are related to areas like Flocking and Kinetic energy.

His most cited work include:

• From particle to kinetic and hydrodynamic descriptions of flocking (362 citations)
• A simple proof of the Cucker-Smale flocking dynamics and mean-field limit (306 citations)
• Emergence of time-asymptotic flocking in a stochastic Cucker-Smale system (138 citations)

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

Seung-Yeal Ha focuses on Statistical physics, Kuramoto model, Mathematical analysis, Classical mechanics and Flocking. The various areas that Seung-Yeal Ha examines in his Statistical physics study include Dynamics, Flocking, Inertia, Coupling strength and Kinetic energy. His research investigates the connection between Flocking and topics such as Applied mathematics that intersect with problems in Limit.

His research investigates the connection with Mathematical analysis and areas like Boltzmann equation which intersect with concerns in Lattice Boltzmann methods. His study in Classical mechanics is interdisciplinary in nature, drawing from both Quantum and Vlasov equation. His study in Complex system extends to Flocking with its themes.

He most often published in these fields:

• Statistical physics (58.53%)
• Kuramoto model (34.12%)
• Mathematical analysis (24.41%)

What were the highlights of his more recent work (between 2019-2021)?

• Statistical physics (58.53%)
• Kuramoto model (34.12%)
• Tensor (8.24%)

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

His main research concerns Statistical physics, Kuramoto model, Tensor, Dynamics and Kinetic energy. His Statistical physics research is multidisciplinary, incorporating perspectives in Order, State, Frustration, Flocking and Space. His Flocking research is multidisciplinary, relying on both Field, Stochastic dynamics and Topology.

His work in Kinetic energy covers topics such as Particle which are related to areas like Lyapunov function, Viscous liquid and Coupling. His Applied mathematics research incorporates themes from Weight function and Flocking. His studies in Group ring integrate themes in fields like Structure, Mathematical analysis and Nonlinear system.

Between 2019 and 2021, his most popular works were:

• Emergent Behaviors of Lohe Tensor Flocks (17 citations)
• Convergence of a first-order consensus-based global optimization algorithm (13 citations)
• Convergence of a first-order consensus-based global optimization algorithm (13 citations)

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

• Quantum mechanics
• Mathematical analysis
• Geometry

His primary areas of study are Kuramoto model, Statistical physics, Tensor, Frustration and Coupling. Seung-Yeal Ha applies his multidisciplinary studies on Statistical physics and Regular ring in his research. His research investigates the link between Tensor and topics such as Rank that cross with problems in Space.

In his work, Hermitian matrix and Mathematical physics is strongly intertwined with Dynamics, which is a subfield of Frustration. His Mathematical physics research integrates issues from Complex system, Flocking, Exponential function and Euler's formula. His work in Type addresses issues such as Flow, which are connected to fields such as Structure, Group, Group ring and Lyapunov functional.

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