What is he best known for?
The fields of study he is best known for:
- Mathematical analysis
- Algebra
- Quantum mechanics
His primary scientific interests are in Mathematical physics, Integrable system, Mathematical analysis, Singularity and Lax pair.
The concepts of his Mathematical physics study are interwoven with issues in Korteweg–de Vries equation, Motion, Soliton, Partial differential equation and Differential equation.
His Integrable system research is included under the broader classification of Pure mathematics.
The various areas that he examines in his Pure mathematics study include Iterated function and Differential.
His work on Discrete form, Separable partial differential equation and Exact differential equation as part of his general Mathematical analysis study is frequently connected to Dynamo, thereby bridging the divide between different branches of science.
B. Grammaticos has included themes like Bilinear interpolation, Quantum gravity, Algebraic number, Entropy and Algorithm in his Singularity study.
His most cited work include:
- Do integrable mappings have the Painlevé property (448 citations)
- Discrete versions of the Painlevé equations. (342 citations)
- Extending the SIR epidemic model (98 citations)
What are the main themes of his work throughout his whole career to date?
His scientific interests lie mostly in Integrable system, Pure mathematics, Mathematical analysis, Singularity and Mathematical physics.
His research investigates the link between Integrable system and topics such as Algebraic number that cross with problems in Entropy.
While the research belongs to areas of Pure mathematics, B. Grammaticos spends his time largely on the problem of Bilinear interpolation, intersecting his research to questions surrounding Bilinear form and Nonlinear system.
His studies in Mathematical analysis integrate themes in fields like Dynamical systems theory, Applied mathematics and Variables.
His Singularity analysis study in the realm of Singularity connects with subjects such as Property.
The study incorporates disciplines such as Korteweg–de Vries equation, Soliton, Hamiltonian and Lattice in addition to Mathematical physics.
He most often published in these fields:
- Integrable system (37.24%)
- Pure mathematics (34.73%)
- Mathematical analysis (32.22%)
What were the highlights of his more recent work (between 2012-2021)?
- Pure mathematics (34.73%)
- Integrable system (37.24%)
- Mathematical analysis (32.22%)
In recent papers he was focusing on the following fields of study:
His primary scientific interests are in Pure mathematics, Integrable system, Mathematical analysis, Affine transformation and Algebra.
B. Grammaticos has researched Pure mathematics in several fields, including Type and Variables.
His Integrable system research is multidisciplinary, relying on both Discrete mathematics, Gravitational singularity and Hamiltonian formalism.
His studies deal with areas such as Completeness, Singularity and Degree as well as Gravitational singularity.
The Algebraic number, Independent equation and Simultaneous equations research B. Grammaticos does as part of his general Mathematical analysis study is frequently linked to other disciplines of science, such as Continuous automaton, therefore creating a link between diverse domains of science.
His Algebra research is multidisciplinary, incorporating elements of Discretization and Hamiltonian.
Between 2012 and 2021, his most popular works were:
- Discrete Painlevé equations associated with the affine Weyl group E8 (25 citations)
- Deautonomisation by singularity confinement: an algebro-geometric justification (20 citations)
- Deautonomization by singularity confinement: an algebro-geometric justification (18 citations)
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