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Analysis of the family of integral equation involving incomplete types of <i>I</i> and <i>Ī</i> -functions

Sanjay Bhatter, Kamlesh Jangid, Shyamsunder Kumawat, Dumitru Bǎleanu, D. L. Suthar, Sunıl Dutt Purohıt

2023Applied Mathematics in Science and Engineering15 citationsDOIOpen Access PDF

Abstract

The present article introduces and studies the Fredholm-type integral equation with an incomplete I-function (IIF) and an incomplete I¯-function (II¯F) in its kernel. First, using fractional calculus and the Mellin transform principle, we solve an integral problem involving IIF. The idea of the Mellin transform and fractional calculus is then used to analyse an integral equation using the incomplete I¯-function. This is followed by the discovery and investigation of several important exceptional cases. This article's general discoveries may yield new integral equations and solutions. The desired outcomes seem to be very helpful in resolving many real-world problems whose solutions represent different physical phenomena. And also, findings help solve introdifferential, fractional differential, and extended integral equation problems.

Topics & Concepts

Integral transformIntegral equationMellin transformMathematicsFredholm integral equationFractional calculusKernel (algebra)Function (biology)Applied mathematicsCalculus (dental)Summation equationType (biology)Mathematical analysisPure mathematicsFourier transformDentistryEcologyBiologyMedicineEvolutionary biologyFractional Differential Equations SolutionsMathematical functions and polynomialsIterative Methods for Nonlinear Equations