Andrei Vladimirovich Marshakov

What is he best known for?

The fields of study he is best known for:

• Quantum mechanics
• Mathematical analysis
• Algebra

His primary scientific interests are in Mathematical physics, Quantum mechanics, Partition function, Supersymmetry and Matrix. His Mathematical physics research is multidisciplinary, relying on both Conformal field theory and Field. His study in the field of Semiclassical physics, Spin-½, Spin chain and Gauge group also crosses realms of Fundamental representation.

His Partition function research incorporates themes from Grassmannian, Pure mathematics, Toda lattice, Limit and Continuum. His research in Supersymmetry intersects with topics in Effective action, Algebraic number, Riemann hypothesis, Generalization and Yang–Mills theory. His Integrable system research is multidisciplinary, incorporating elements of Quantum, 1/N expansion, Scalar and Meromorphic function.

His most cited work include:

• Classical/quantum integrability in AdS/CFT (645 citations)
• Classical/quantum integrability in AdS/CFT (645 citations)
• Integrability and Seiberg-Witten exact solution (558 citations)

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

Andrei Marshakov mainly focuses on Mathematical physics, Integrable system, Gauge theory, Pure mathematics and Supersymmetry. His Mathematical physics study incorporates themes from Matrix, Quantum mechanics and Quantum electrodynamics. In his study, which falls under the umbrella issue of Integrable system, Scalar is strongly linked to Semiclassical physics.

His Gauge theory research is multidisciplinary, incorporating perspectives in Theoretical physics, String, Quiver and Quantum field theory. Andrei Marshakov combines subjects such as Conformal map, Group, Integer and Partition function with his study of Pure mathematics. Andrei Marshakov has researched Supersymmetry in several fields, including Compactification, Effective action, Abelian group and Adjoint representation.

He most often published in these fields:

• Mathematical physics (60.59%)
• Integrable system (44.83%)
• Gauge theory (28.57%)

What were the highlights of his more recent work (between 2012-2020)?

• Pure mathematics (29.06%)
• Integrable system (44.83%)
• Conformal map (12.32%)

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

His primary areas of study are Pure mathematics, Integrable system, Conformal map, Gauge theory and Supersymmetric gauge theory. His Pure mathematics research integrates issues from Class and Integer. His studies deal with areas such as Automorphism, Cluster, Lie group, Boundary and Poisson bracket as well as Integrable system.

His study in the field of Conformal field theory is also linked to topics like Computation. In Gauge theory, Andrei Marshakov works on issues like Quiver, which are connected to Mathematical physics, Instanton, Differential equation, Lattice gauge theory and Gauge anomaly. His study on Mathematical physics is mostly dedicated to connecting different topics, such as Quantum mechanics.

Between 2012 and 2020, his most popular works were:

• Lie groups, cluster variables and integrable systems (34 citations)
• Lie groups, cluster variables and integrable systems (34 citations)
• Cluster integrable systems, q -Painlevé equations and their quantization (28 citations)

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

• Mathematical analysis
• Quantum mechanics
• Algebra

His main research concerns Pure mathematics, Ramanujan tau function, Integrable system, Gauge theory and Supersymmetric gauge theory. His biological study spans a wide range of topics, including Fermion and Integer. His study of Toda lattice is a part of Integrable system.

His Gauge theory research incorporates elements of Conformal map and Quiver. His Quiver study combines topics in areas such as Mathematical physics and Semiclassical physics. Andrei Marshakov interconnects Regular polygon, Quantization, Riemann hypothesis, Sequence and Central charge in the investigation of issues within Supersymmetric gauge theory.