Muhammad Aslam Noor

What is he best known for?

The fields of study he is best known for:

• Mathematical analysis
• Algebra
• Partial differential equation

His primary areas of study are Applied mathematics, Variational inequality, Iterative method, Mathematical analysis and Mathematical optimization. The various areas that he examines in his Applied mathematics study include Class, Convex function, Approximate solution and Complementarity theory. His work deals with themes such as Fixed point, Hilbert space, Optimization problem, Monotonic function and Calculus, which intersect with Variational inequality.

His Fixed point research is multidisciplinary, incorporating perspectives in Scheme and Equivalence. His biological study spans a wide range of topics, including Projection, Equivalence, Theory of computation and Relaxation, Nonlinear system. Mathematical analysis is closely attributed to Reliability in his study.

His most cited work include:

• Some developments in general variational inequalities (449 citations)
• New approximation schemes for general variational inequalities (428 citations)
• General variational inequalities (337 citations)

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

Muhammad Aslam Noor mostly deals with Variational inequality, Applied mathematics, Iterative method, Mathematical analysis and Mathematical optimization. He has included themes like Fixed point, Resolvent, Class, Monotonic function and Calculus in his Variational inequality study. His study looks at the relationship between Applied mathematics and topics such as Nonlinear system, which overlap with Decomposition method.

His Iterative method study combines topics in areas such as Projection, Simple, Hilbert space and Relaxation. His Mathematical analysis research is multidisciplinary, relying on both Convex function and Pure mathematics. The Boundary value problem study combines topics in areas such as Order and Convergent series.

He most often published in these fields:

• Variational inequality (49.93%)
• Applied mathematics (44.49%)
• Iterative method (37.98%)

What were the highlights of his more recent work (between 2017-2021)?

• Pure mathematics (18.73%)
• Convex function (13.55%)
• Type (9.69%)

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

Muhammad Aslam Noor focuses on Pure mathematics, Convex function, Type, Applied mathematics and Inequality. The Pure mathematics study combines topics in areas such as Function, Class, Hadamard transform and Order. His Convex function research incorporates themes from Exponential growth, Mathematical analysis, Harmonic and Conformable matrix.

As part of the same scientific family, Muhammad Aslam Noor usually focuses on Type, concentrating on Fractional calculus and intersecting with Calculus. His primary area of study in Applied mathematics is in the field of Variational inequality. His work investigates the relationship between Variational inequality and topics such as Projection that intersect with problems in Optimization problem.

Between 2017 and 2021, his most popular works were:

• Inequalities by Means of Generalized Proportional Fractional Integral Operators with Respect to Another Function (61 citations)
• Hermite-Hadamard Type Inequalities for the Class of Convex Functions on Time Scale (45 citations)
• New weighted generalizations for differentiable exponentially convex mapping with application (39 citations)

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

• Mathematical analysis
• Algebra
• Real number

His primary scientific interests are in Pure mathematics, Convex function, Type, Hermite–Hadamard inequality and Inequality. His Pure mathematics research is multidisciplinary, incorporating perspectives in Riemann liouville, Order and Operator. His study in Convex function is interdisciplinary in nature, drawing from both Hadamard transform, Exponential growth, Conformable matrix and Monotonic function.

He has included themes like Scale, Mathematical problem, Hermite polynomials, Fractional calculus and Class in his Type study. Applied mathematics covers he research in Fractional calculus. His research in Applied mathematics intersects with topics in Numerical approximation and Random variable.

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