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- Abdullahi Yusuf

Discipline name
D-index
D-index (Discipline H-index) only includes papers and citation values for an examined
discipline in contrast to General H-index which accounts for publications across all
disciplines.
Citations
Publications
World Ranking
National Ranking

Mathematics
D-index
38
Citations
4,726
183
World Ranking
1608
National Ranking
10

- Quantum mechanics
- Mathematical analysis
- Statistics

Abdullahi Yusuf spends much of his time researching Applied mathematics, Symmetry, Conservation law, Nonlinear system and Fractional calculus. His Applied mathematics research includes elements of Kernel, Fixed-point theorem, Ordinary differential equation, Differential equation and Integer. His studies in Symmetry integrate themes in fields like Power series, Derivative, Order and Ode.

His research investigates the link between Conservation law and topics such as Partial differential equation that cross with problems in Classical mechanics. His Nonlinear system research incorporates elements of Constraint, Computer simulation and Instability. The concepts of his Soliton study are interwoven with issues in Mathematical analysis and Algebraic number.

- Modeling chickenpox disease with fractional derivatives: From caputo to atangana-baleanu (99 citations)
- Fractional modeling of blood ethanol concentration system with real data application. (90 citations)
- Fractional derivatives applied to MSEIR problems: Comparative study with real world data (77 citations)

His primary scientific interests are in Nonlinear system, Applied mathematics, Conservation law, Soliton and Mathematical analysis. His work deals with themes such as Partial differential equation, Instability, Classical mechanics and Ansatz, which intersect with Nonlinear system. His study in the field of Fractional calculus is also linked to topics like Operator.

In his study, Order is strongly linked to Derivative, which falls under the umbrella field of Fractional calculus. His Conservation law research also works with subjects such as

- Symmetry that connect with fields like Power series and Ode,
- Mathematical physics, which have a strong connection to Beta. Abdullahi Yusuf has researched Soliton in several fields, including Schrödinger's cat and Constraint.

- Nonlinear system (39.35%)
- Applied mathematics (34.84%)
- Conservation law (27.10%)

- Applied mathematics (34.84%)
- Mathematical analysis (18.71%)
- Fractional calculus (12.90%)

Applied mathematics, Mathematical analysis, Fractional calculus, Nonlinear system and Uniqueness are his primary areas of study. His Applied mathematics study combines topics in areas such as Laplace transform and Differential equation. His One-dimensional space and Conservation law study in the realm of Mathematical analysis interacts with subjects such as Function and Waves and shallow water.

His Fractional calculus study incorporates themes from Derivative and Conformable matrix. His Nonlinear system research is multidisciplinary, incorporating elements of Variable, Instability, Optics and Dynamics. As part of one scientific family, Abdullahi Yusuf deals mainly with the area of Uniqueness, narrowing it down to issues related to the Fixed-point theorem, and often Curve fitting, Ordinary differential equation, Equilibrium point and Integer.

- Mathematical modeling of COVID-19 epidemic with effect of awareness programs. (11 citations)
- Mathematical model to assess the imposition of lockdown during COVID-19 pandemic (11 citations)
- Mathematical modeling of pine wilt disease with Caputo fractional operator (10 citations)

- Quantum mechanics
- Mathematical analysis
- Statistics

Abdullahi Yusuf mostly deals with Fractional calculus, Uniqueness, Sensitivity, Applied mathematics and Pandemic. To a larger extent, Abdullahi Yusuf studies Mathematical analysis with the aim of understanding Fractional calculus. His work on Uniqueness is being expanded to include thematically relevant topics such as Fixed-point theorem.

His studies deal with areas such as Equilibrium point, Curve fitting and Ordinary differential equation as well as Fixed-point theorem. His Applied mathematics study typically links adjacent topics like Stability theory. The various areas that Abdullahi Yusuf examines in his China study include Fractional operator, Health care and Econometrics.

This overview was generated by a machine learning system which analysed the scientist’s body of work. If you have any feedback, you can contact us here.

Modeling chickenpox disease with fractional derivatives: From caputo to atangana-baleanu

Sania Qureshi;Abdullahi Yusuf.

Chaos Solitons & Fractals **(2019)**

145 Citations

Fractional modeling of blood ethanol concentration system with real data application.

Sania Qureshi;Sania Qureshi;Abdullahi Yusuf;Asif Ali Shaikh.

Chaos **(2019)**

140 Citations

Soliton solutions and conservation laws for lossy nonlinear transmission line equation

Fairouz Tchier;Abdullahi Yusuf;Aliyu Isa Aliyu.

Superlattices and Microstructures **(2017)**

123 Citations

The new exact solitary wave solutions and stability analysis for the ( 2 + 1 ) $(2+1)$ -dimensional Zakharov–Kuznetsov equation

Behzad Ghanbari;Abdullahi Yusuf;Dumitru Baleanu.

Advances in Difference Equations **(2019)**

121 Citations

A new fractional HRSV model and its optimal control: A non-singular operator approach

Amin Jajarmi;Abdullahi Yusuf;Dumitru Baleanu.

Physica A-statistical Mechanics and Its Applications **(2020)**

114 Citations

Fractional derivatives applied to MSEIR problems: Comparative study with real world data

Sania Qureshi;Abdullahi Yusuf.

European Physical Journal Plus **(2019)**

112 Citations

Two-strain epidemic model involving fractional derivative with Mittag-Leffler kernel.

Abdullahi Yusuf;Sania Qureshi;Aliyu Isa Aliyu.

Chaos **(2018)**

94 Citations

Optical and other solitons for the fourth-order dispersive nonlinear Schrödinger equation with dual-power law nonlinearity

Maysaa Mohamed Al Qurashi;Abdullahi Yusuf;Aliyu Isa Aliyu.

Superlattices and Microstructures **(2017)**

92 Citations

Lie symmetry analysis, exact solutions and conservation laws for the time fractional Caudrey-Dodd-Gibbon-Sawada-Kotera equation

Dumitru Baleanu;Abdullahi Yusuf;Aliyu Isa Aliyu.

Communications in Nonlinear Science and Numerical Simulation **(2018)**

89 Citations

Time-fractional Cahn–Allen and time-fractional Klein–Gordon equations: Lie symmetry analysis, explicit solutions and convergence analysis

Abdullahi Yusuf;Aliyu Isa Aliyu;Dumitru Baleanu.

Physica A-statistical Mechanics and Its Applications **(2018)**

78 Citations

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