Classifications and duality relations for several integral transforms

In this paper, we classify several integral transforms into two categories according to the types of their kernel functions and two novel definitions of general integral transforms are suggested. Based on the general integral transforms, some of their basic properties are proved. In addition, the dualities between those two kinds of integral transforms are deducted and discussed in detail. The interesting coupling relations in symmetric form is illustrated graphically. The analysis shows that the classifications are reasonable and the dualities are significant. c ©2017 All rights reserved.

[1]  S. Arabia,et al.  LOCAL FRACTIONAL VARIATIONAL ITERATION METHOD FOR DIFFUSION AND WAVE EQUATIONS ON CANTOR SETS , 2014 .

[2]  Maysaa Mohamed Al Qurashi,et al.  A Novel Numerical Approach for a Nonlinear Fractional Dynamical Model of Interpersonal and Romantic Relationships , 2017, Entropy.

[3]  Xiaojun Yang,et al.  A new integral transform operator for solving the heat-diffusion problem , 2017, Appl. Math. Lett..

[4]  Abdon Atangana,et al.  Extension of the Sumudu homotopy perturbation method to an attractor for one-dimensional Keller–Segel equations , 2015 .

[5]  F. Gao,et al.  Applications of a novel integral transform to partial differential equations , 2017 .

[6]  Hassan Eltayeb,et al.  A note on solutions of wave, Laplace's and heat equations with convolution terms by using a double Laplace transform , 2008, Appl. Math. Lett..

[7]  Sunethra Weerakoon,et al.  Application of Sumudu transform to partial differential equations , 1994 .

[8]  A. Kılıçman,et al.  A note on the comparison between Laplace and Sumudu transforms , 2011 .

[9]  S. M. Elzaki Application of New Transform "Elzaki Transform" to Partial Differential Equations , 2011 .

[10]  Heejae Han,et al.  Analytic solution for American strangle options using Laplace-Carson transforms , 2017, Commun. Nonlinear Sci. Numer. Simul..

[11]  Xiao‐Jun Yang,et al.  A new technique for solving the 1-D burgers equation , 2017 .

[12]  C. Donolato Analytical and numerical inversion of the Laplace–Carson transform by a differential method , 2002 .

[13]  Dumitru Baleanu,et al.  A hybrid computational approach for Klein–Gordon equations on Cantor sets , 2017 .

[14]  Michael D. Gilchrist,et al.  Numerical inversion of the Laplace–Carson transform applied to homogenization of randomly reinforced linear viscoelastic media , 2007 .

[15]  Adem Kiliçman,et al.  On the applications of Laplace and Sumudu transforms , 2010, J. Frankl. Inst..

[16]  Xiao-Jun Yang,et al.  A new integral transform method for solving steady heat-transfer problem , 2016 .

[17]  Dumitru Baleanu,et al.  On a new class of fractional operators , 2017, Advances in Difference Equations.

[18]  Shyam L. Kalla,et al.  ANALYTICAL INVESTIGATIONS OF THE SUMUDU TRANSFORM AND APPLICATIONS TO INTEGRAL PRODUCTION EQUATIONS , 2003 .

[19]  Lokenath Debnath,et al.  Introduction to the Theory and Application of the Laplace Transformation , 1974, IEEE Transactions on Systems, Man, and Cybernetics.

[20]  Devendra Kumar,et al.  A computational approach for fractional convection-diffusion equation via integral transforms , 2016, Ain Shams Engineering Journal.

[21]  H. Srivastava,et al.  A NEW INTEGRAL TRANSFORM AND ITS APPLICATIONS , 2015 .

[22]  Adem Kilicman,et al.  On Double Sumudu Transform and Double Laplace Transform , 2010 .

[23]  Xiao-Jun Yang,et al.  A new integral transform with an application in heat-transfer problem , 2016 .

[24]  J. F. Gómez‐Aguilar,et al.  A new derivative with normal distribution kernel: Theory, methods and applications , 2017 .

[25]  D. Baleanu,et al.  On fractional derivatives with exponential kernel and their discrete versions , 2016, 1606.07958.

[26]  Xin Liang,et al.  Applications of a novel integral transform to the convection-dispersion equations , 2017 .