Muhammad Aamir Ali

According to our database1, Muhammad Aamir Ali authored at least 16 papers between 2015 and 2022.

Collaborative distances:
  • Dijkstra number2 of five.
  • Erdős number3 of four.



In proceedings 
PhD thesis 


Online presence:



Simpson's and Newton's Type Inequalities for (α, m)-Convex Functions via Quantum Calculus.
Symmetry, 2022

On Generalization of Different Integral Inequalities for Harmonically Convex Functions.
Symmetry, 2022

On Fractional Newton Inequalities via Coordinated Convex Functions.
Symmetry, 2022

Post-Quantum Midpoint-Type Inequalities Associated with Twice-Differentiable Functions.
Axioms, 2022

On Some New Ostrowski-Mercer-Type Inequalities for Differentiable Functions.
Axioms, 2022

On Some New Simpson's Formula Type Inequalities for Convex Functions in Post-Quantum Calculus.
Symmetry, 2021

Hermite-Hadamard Inclusions for Co-Ordinated Interval-Valued Functions via Post-Quantum Calculus.
Symmetry, 2021

On Some New Fractional Ostrowski- and Trapezoid-Type Inequalities for Functions of Bounded Variations with Two Variables.
Symmetry, 2021

On Some New Trapezoidal Type Inequalities for Twice (p, q) Differentiable Convex Functions in Post-Quantum Calculus.
Symmetry, 2021

On Some New Inequalities of Hermite-Hadamard Midpoint and Trapezoid Type for Preinvex Functions in p, q-Calculus.
Symmetry, 2021

Some New Simpson's-Formula-Type Inequalities for Twice-Differentiable Convex Functions via Generalized Fractional Operators.
Symmetry, 2021

Some New Hermite-Hadamard and Related Inequalities for Convex Functions via (p, q)-Integral.
Entropy, 2021

Some Parameterized Quantum Midpoint and Quantum Trapezoid Type Inequalities for Convex Functions with Applications.
Entropy, 2021

Some New Newton's Type Integral Inequalities for Co-Ordinated Convex Functions in Quantum Calculus.
Symmetry, 2020

Some New Quantum Hermite-Hadamard-Like Inequalities for Coordinated Convex Functions.
J. Optim. Theory Appl., 2020

New iterative technique for solving nonlinear equations.
Appl. Math. Comput., 2015