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On the construction of the Riemann function for an equation with leading fifth partial derivative which the Riemann function is a solution of a system of two integral equations. The result is used
Is it possible to derive Newtonian equations of motion with memory?In this paper for a given example we proved that the Riemann-Liouville fractional integral term
Application of Riemann–Hilbert Problem Solutions to a Study of Nonlinear Boundary Value Problems for Timoshenko Type Inhomogeneous Shells with Free EdgesApplication of Riemann–Hilbert Problem Solutions to a Study of Nonlinear Boundary Value Problems
'Fractional' kinetic equations and 'universal' decoupling of a memory function in mesoscale region function recovers the Riemann-Liouville integral. For a strongly correlated fractal medium a generalization
The riemann boundary value problem on non-rectifiable arcs and the cauchy transform Cauchy integral over non-rectifiable arcs on the complex plane. We construct this integral
Inequalities Involving Fractional Integrals of a Function and Its Derivative of the derivative through fractional Riemann–Liouville integrals are obtained.
Solvability of the Goursat problem in quadratures of the Riemann method and the cascade integration. The results are applied to two Volterra equations
Best Approximations of Solutions of Fractional-integral Equations with the Riemann-Liouville Operator of integral equations that are defined on the line segment and have a fractional Riemann-Liouville integral
On the construction of the Riemann function for an equation with leading fifth partial derivative which the Riemann function is a solution of a system of two integral equations. The result is used
'Fractional' kinetic equations and 'universal' decoupling of a memory function in mesoscale region function recovers the Riemann-Liouville integral. For a strongly correlated fractal medium a generalization
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