What is he best known for?
The fields of study he is best known for:
- Quantum mechanics
- Mathematical analysis
- Algebra
Daniele C. Struppa focuses on Algebra, Pure mathematics, Holomorphic function, Variable and Functional calculus.
His Algebra research incorporates elements of Bicomplex number and Clifford analysis.
He specializes in Pure mathematics, namely Clifford algebra.
His studies in Holomorphic function integrate themes in fields like Discrete mathematics, Convolution and Complex plane.
His Variable study combines topics from a wide range of disciplines, such as Complete theory and Power series.
His studies deal with areas such as Noncommutative geometry, Operator theory, Time-scale calculus, Borel functional calculus and Holomorphic functional calculus as well as Functional calculus.
His most cited work include:
- A New Theory of Regular Functions of a Quaternionic Variable (328 citations)
- Analysis of Dirac Systems and Computational Algebra (187 citations)
- Noncommutative Functional Calculus (184 citations)
What are the main themes of his work throughout his whole career to date?
The scientist’s investigation covers issues in Pure mathematics, Algebra, Holomorphic function, Mathematical analysis and Clifford algebra.
His study explores the link between Pure mathematics and topics such as Variable that cross with problems in Series.
The various areas that Daniele C. Struppa examines in his Algebra study include Convolution, Operator theory, Algebraic analysis and Clifford analysis.
His work deals with themes such as Fourier transform and Schrödinger equation, which intersect with Convolution.
His Operator theory research integrates issues from Functional calculus and Borel functional calculus.
Holomorphic function and Extension are commonly linked in his work.
He most often published in these fields:
- Pure mathematics (42.81%)
- Algebra (25.34%)
- Holomorphic function (11.99%)
What were the highlights of his more recent work (between 2017-2021)?
- Pure mathematics (42.81%)
- Schrödinger equation (6.16%)
- Exterior algebra (2.05%)
In recent papers he was focusing on the following fields of study:
His main research concerns Pure mathematics, Schrödinger equation, Exterior algebra, Entire function and Algebra over a field.
The study incorporates disciplines such as Systems of partial differential equations and Order in addition to Pure mathematics.
His Schrödinger equation study integrates concerns from other disciplines, such as Mathematical physics, Generalized function, Exponential function, Function and Variable.
His work carried out in the field of Entire function brings together such families of science as Space, Convolution and Type.
His Series research is within the category of Algebra.
His research integrates issues of Differentiable function, Operator theory, Dimension and Algebraic analysis in his study of Algebra.
Between 2017 and 2021, his most popular works were:
- Roadmap on superoscillations (66 citations)
- Continuity of some operators arising in the theory of superoscillations (28 citations)
- Continuity Theorems for a Class of Convolution Operators and Applications to Superoscillations (28 citations)
In his most recent research, the most cited papers focused on:
- Quantum mechanics
- Mathematical analysis
- Algebra
His primary scientific interests are in Schrödinger equation, Pure mathematics, Convolution, Entire function and Mathematical physics.
His Schrödinger equation research is multidisciplinary, incorporating elements of Uniform convergence, Combinatorics, Lambda, Gravitational singularity and Function.
Specifically, his work in Pure mathematics is concerned with the study of Algebra over a field.
His Convolution study incorporates themes from State and Integrable system.
He combines subjects such as Mathematical proof, Classical mechanics, Current, Computation and Calculus with his study of Entire function.
His study focuses on the intersection of Mathematical physics and fields such as Spectrum with connections in the field of Quadratic equation.
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