Jorge Olivares FunesPablo MartínElvis Valero KariMaría Teresa Veliz Aviles2026-03-222026-03-22202610.9734/bpi/psniad/v4/6785https://doi.org/10.9734/bpi/psniad/v4/6785https://andeanlibrary.org/handle/123456789/83429This work addresses the resolution of fractional differential equations whose nonhomogeneous part is given by the spherical Bessel function \(J_0 (x)\). By using the fractional derivative in the sense of Caputo and the Laplace transform, a general analytical solution is obtained in terms of the generalised hypergeometric functions \( _2 F_3\), revealing a recurrent structure in the solutions. Furthermore, particular cases for integer and fractional orders are presented, highlighting the appearance of special functions such as the sine integral and Fresnel functions. The results confirm the close relationship between fractional calculus and Bessel functions, proposing new perspectives for applications in mathematical physics.Bessel functionMathematicsLaplace transformFractional calculusMathematical analysisSineLaplace transform applied to differential equationsSpecial functionsHypergeometric functionDifferential equationbook-chapter