Duong H. Phong

What is he best known for?

The fields of study he is best known for:

• Mathematical analysis
• Quantum mechanics
• Algebra

Duong H. Phong mostly deals with Mathematical physics, Quantum mechanics, Moduli space, Mathematical analysis and Superstring theory. His research in Quantum mechanics is mostly focused on Projection. His Moduli space research incorporates themes from Measure, Theoretical physics, Geodesic and Selberg zeta function.

His Theoretical physics research incorporates elements of Differential geometry and Riemannian geometry. His study brings together the fields of Pure mathematics and Mathematical analysis. His research integrates issues of String, GSO projection and Euclidean space in his study of Superstring theory.

His most cited work include:

• The Geometry of String Perturbation Theory (611 citations)
• Two-loop superstrings VI Nonrenormalization theorems and the 4-point function ☆ (199 citations)
• Multiloop amplitudes for the bosonic Polyakov string (192 citations)

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

His primary areas of study are Mathematical physics, Mathematical analysis, Pure mathematics, Moduli space and Superstring theory. His research investigates the link between Mathematical physics and topics such as Symplectic geometry that cross with problems in Constant. His work investigates the relationship between Mathematical analysis and topics such as Torsion that intersect with problems in Differential geometry and Zero.

Duong H. Phong works mostly in the field of Pure mathematics, limiting it down to concerns involving Space and, occasionally, Geodesic, Bounded function, Subsequence, Fano plane and Variety. His research in Moduli space intersects with topics in Measure, Theoretical physics, Supergravity, Worldsheet and Quantum mechanics. His Superstring theory study incorporates themes from String, GSO projection, Superposition principle and Analytic continuation.

He most often published in these fields:

• Mathematical physics (37.07%)
• Mathematical analysis (31.90%)
• Pure mathematics (28.45%)

What were the highlights of his more recent work (between 2015-2021)?

• Anomaly (8.62%)
• Pure mathematics (28.45%)
• Metric (6.03%)

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

His scientific interests lie mostly in Anomaly, Pure mathematics, Metric, Mathematical analysis and Ricci flow. While the research belongs to areas of Anomaly, Duong H. Phong spends his time largely on the problem of Partial differential equation, intersecting his research to questions surrounding Mathematical physics, Complex geometry, String theory and Sign. The concepts of his Mathematical physics study are interwoven with issues in Singularity and Heat equation.

His Pure mathematics research integrates issues from String and Heterotic string theory. Duong H. Phong interconnects Topology, Monotonic function, Metric space and Riemann surface in the investigation of issues within Metric. A large part of his Mathematical analysis studies is devoted to Generalization.

Between 2015 and 2021, his most popular works were:

• The Fu-Yau equation with negative slope parameter (52 citations)
• A second order estimate for general complex Hessian equations (36 citations)
• Geometric flows and Strominger systems (30 citations)

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

• Mathematical analysis
• Algebra
• Quantum mechanics

Duong H. Phong mainly investigates Pure mathematics, Anomaly, Hessian equation, Ansatz and Dimension. Duong H. Phong combines subjects such as Heterotic string theory and Nonlinear system with his study of Pure mathematics. Duong H. Phong has researched Anomaly in several fields, including Sign, Mathematical analysis, Stationary point and Implicit function theorem.

His Hessian equation study integrates concerns from other disciplines, such as Scale, Special case, Applied mathematics, Method of continuity and Order. His biological study spans a wide range of topics, including Generalization, Partial differential equation and Prime. Duong H. Phong integrates Dimension and Cone in his studies.

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