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Application of the Efros Theorem to the Function Represented by the Inverse Laplace Transform of s−μ exp(−sν)

Alexander Apelblat, Francesco Mainardi

2021Symmetry16 citationsDOIOpen Access PDF

Abstract

Using a special case of the Efros theorem which was derived by Wlodarski, and operational calculus, it was possible to derive many infinite integrals, finite integrals and integral identities for the function represented by the inverse Laplace transform. The integral identities are mainly in terms of convolution integrals with the Mittag–Leffler and Volterra functions. The integrands of determined integrals include elementary functions (power, exponential, logarithmic, trigonometric and hyperbolic functions) and the error functions, the Mittag–Leffler functions and the Volterra functions. Some properties of the inverse Laplace transform of s−μexp(−sν) with μ≥0 and 0<ν<1 are presented.

Topics & Concepts

Inverse Laplace transformMathematicsLaplace transformLaplace transform applied to differential equationsLaplace–Stieltjes transformTwo-sided Laplace transformMathematical analysisConvolution (computer science)Convolution theoremInverseOperational calculusMellin transformVolterra integral equationPost's inversion formulaGreen's function for the three-variable Laplace equationTrigonometric integralInverse functionFunction (biology)Trigonometric functionsMultiple integralIntegral transformLaplace's methodHyperbolic functionFourier transformIntegral equationTrigonometryIntegration using Euler's formulaInverse trigonometric functionsSine and cosine transformsIntegro-differential equationGeneralized inverseMathematical functions and polynomialsFractional Differential Equations SolutionsAlgebraic and Geometric Analysis