What is he best known for?
The fields of study he is best known for:
- Mathematical analysis
- Algebra
- Hilbert space
Nazim I. Mahmudov mainly focuses on Controllability, Mathematical analysis, Linear system, Nonlinear system and Hilbert space.
His biological study deals with issues like Semigroup, which deal with fields such as Fixed point.
His study in the field of Operator norm, Spectral theorem, Operator theory and Constant coefficients is also linked to topics like Moduli.
His Linear system study combines topics in areas such as Fractional calculus and Differential equation.
His work carried out in the field of Nonlinear system brings together such families of science as Stochastic differential equation and Dynamical systems theory.
His study in Hilbert space is interdisciplinary in nature, drawing from both Banach fixed-point theorem and Distributed parameter system.
His most cited work include:
- APPROXIMATE CONTROLLABILITY OF SEMILINEAR DETERMINISTIC AND STOCHASTIC EVOLUTION EQUATIONS IN ABSTRACT SPACES (187 citations)
- On Concepts of Controllability for Deterministic and Stochastic Systems (152 citations)
- On controllability of linear stochastic systems (147 citations)
What are the main themes of his work throughout his whole career to date?
Nazim I. Mahmudov spends much of his time researching Mathematical analysis, Controllability, Applied mathematics, Pure mathematics and Hilbert space.
His Mathematical analysis research integrates issues from Type and Order.
His Controllability study integrates concerns from other disciplines, such as Control system, Fixed-point theorem, Linear system and Nonlinear system.
Nazim I. Mahmudov works mostly in the field of Fixed-point theorem, limiting it down to topics relating to Semigroup and, in certain cases, Schauder fixed point theorem.
His Applied mathematics study also includes
- Differential equation that connect with fields like Stochastic differential equation,
- Permutable prime which is related to area like Representation.
Nazim I. Mahmudov has included themes like Fixed point, Banach fixed-point theorem, Heat equation, Evolution equation and Generalization in his Hilbert space study.
He most often published in these fields:
- Mathematical analysis (45.00%)
- Controllability (33.75%)
- Applied mathematics (31.87%)
What were the highlights of his more recent work (between 2018-2021)?
- Applied mathematics (31.87%)
- Fractional calculus (16.25%)
- Uniqueness (10.00%)
In recent papers he was focusing on the following fields of study:
His primary areas of study are Applied mathematics, Fractional calculus, Uniqueness, Differential equation and Type.
His studies in Applied mathematics integrate themes in fields like Function, Norm, Controllability and Variation of parameters.
Nazim I. Mahmudov performs multidisciplinary study in the fields of Controllability and Mean square via his papers.
In the field of Fractional calculus, his study on Fractional differential overlaps with subjects such as Bivariate analysis, Homogeneous and Substitution.
His Uniqueness study is concerned with Mathematical analysis in general.
His Differential equation research includes themes of Sign, Order, Special case and Nonlinear system.
Between 2018 and 2021, his most popular works were:
- Delayed perturbation of Mittag‐Leffler functions and their applications to fractional linear delay differential equations (14 citations)
- A novel fractional delayed matrix cosine and sine (9 citations)
- Existence and uniqueness results for a class of fractional stochastic neutral differential equations (8 citations)
In his most recent research, the most cited papers focused on:
- Mathematical analysis
- Algebra
- Differential equation
Nazim I. Mahmudov mainly investigates Applied mathematics, Fractional calculus, Function, Uniqueness and Delay differential equation.
Nazim I. Mahmudov combines subjects such as Norm, Type and Variation of parameters with his study of Applied mathematics.
His studies deal with areas such as Initial value problem, Matrix, Trigonometric functions, Sine and Order as well as Variation of parameters.
In general Fractional calculus, his work in Fractional differential is often linked to Homogeneous and Bivariate analysis linking many areas of study.
The research on Mathematical analysis and Boundary value problem is part of his Fractional differential project.
The Function study combines topics in areas such as Riemann hypothesis, Convolution, Derivative and Extension.
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