Research Article
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Year 2023, Volume: 36 Issue: 1, 362 - 381, 01.03.2023
https://doi.org/10.35378/gujs.813138

Abstract

References

  • [1] Debnath, L., and Bhatta, D., “Integral Transforms and Their Applications”, 2nd Edition, Chapman Hall/CRC, Boca Raton, FL, (2007).
  • [2] Miller, K.S., and Ross, B., “An Introduction to Fractional Calculus and Fractional Differential Equations”, John Wiley-Interscience Publication, New York, Toronto Singapore, (1993).
  • [3] Podlubny, I., “Fractional Differential Equations: an Introduction to Fractional Derivatives, Fractional Differential Equations, to Methods of Their Solution and Some of Their Applications”, Mathematics in Science and Engineering, Academic Press, London, (1999).
  • [4] Dernek, A.N., and Aylıkcı F., "Some results on the 𝒫ν,2n,𝒦ν,n and Hν,n-integral transforms", Turkish Journal of Mathematics, 41(2): 337-349, (2017). DOI:10.3906/mat-1501-79
  • [5] Yürekli, O., and Sadek, I., "A Parseval-Goldstein type theorem on the Widder potential transform and its applications", International Journal of Mathematics and Mathematical Sciences, 14(3): 517-524, (1991). DOI:10.1155/S0161171291000704
  • [6] Yürekli, O., "Identities on fractional integrals and various integral transforms", Applied Mathematics and Computation, 187: 559-566, (2007). DOI: 10.1016/j.amc.2006.09.001
  • [7] Dernek, N., Aylıkcı, F., and Balaban, G., "New identities for the generalized Glasser transform, the generalized Laplace transform and the ℇ2𝑛,1-transform", IECMSA-IV., Book of Abstracts: 135-138, (2015).
  • [8] Dernek, N., Ölçücü E.Ö., and Aylıkcı, F., "New identities and Parseval type relations for the generalized integral transforms ℒ4n,𝒫4n,ℱs,2n and ℱc,2n", Applied Mathematics and Computation, 269: 536-547, (2015). DOI: 10.1016/j.amc.2015.07.095.
  • [9] Erdelyi, A., Magnus, W., Oberhettinger, F. and Tricomi F.G., “Tables of Integral Transforms. Vol. II”, McGraw-Hill Book Company, Inc., New York-Toronto-London, based, in part, on notes left by Harry Bateman, (1954).
  • [10] Widder, D.V., “An Introduction to Transform Theory”, New York: Academic Press, bibliography: 243-246, (1971).
  • [11] Glasser, M.L., “Some Bessel function integrals”, Kyungpook Mathematical Journal, 13(2): 171-174, (1973).
  • [12] Erdelyi, A., Magnus, W., Oberhettinger, F., and Tricomi, F.G., “Higher Transcendental Functions. Vol. I”, Robert E. Krieger Publishing Co., Inc., Melbourne, Fla., 1981, based on notes left by Harry Bateman, With a preface by Mina Rees, With a foreword by E. C. Watson, Reprint of the (1953) original.
  • [13]Erdelyi, A., Magnus, W., Oberhettinger, F., and Tricomi, F.G., “Higher Transcendental Functions. Vol. II”, Robert E. Krieger Publishing Co., Inc., Melbourne, Fla., 1981, based on notes left by Harry Bateman, Reprint of the (1953) original.
  • [14] Erdelyi, A., Magnus, W., Oberhettinger, F., and Tricomi, F.G., “Tables of Integral Transforms. Vol. I”, McGraw-Hill Book Company, Inc., New York-Toronto-London, (1954), based, in part, on notes left by Harry Bateman.
  • [15]Jangid, K., Parmar, R.K., Agarwal, R., and Purohit, S.D., “Fractional calculus and integral transforms of the product of a general class of polynomial and incomplete Fox–Wright functions”, Advances in Difference Equations, 606: 1-17, (2020). DOI:10.1186/s13662-020-03067-0
  • [16]Agarwal, R., Yadav, M.P., Baleanu, D., and Purohit, S.D., “Existence and uniqueness of miscible flow equation through porous media with a non singular fractional derivative”, AIMS Mathematics, 5(2): 1062–1073, (2020). DOI: 10.3934/math.2020074
  • [17] Song, L., Xu, S., and Yang, Y., “Dynamical models of happiness with fractional order”, Communications in Nonlinear Science and Numerical Simulation, 15(3): 616-628, (2010).
  • [18] De, Gaetano, A., Sakulrang, S., Borri, A., Pitocco, D., Sungnul, S., and Moore, E.J., “Modeling continuous glucose monitoring with fractional differential equations subject to shocks”, Journal of Theoretical Biology, 526: 110776, (2021).
  • [19] Shen, W.Y., Chu,Y.M., ur, Rahman, M., Mahariq, I., and Zeb, A., “Mathematical analysis of HBV and HCV co-infection model under nonsingular fractional order derivative”, Results in Physics, 28: 104582, (2021).
  • [20] Jafari, H., Ganji, R.M., Nkomo, N.S., and Lv, Y.P.A., “Numerical study of fractional order population dynamics model”, Results in Physics, 27: 104456, (2021).

Some Relations for the Generalized G ̃n,P ̃n Integral Transforms and Riemann-Liouville, Weyl Integral Operators

Year 2023, Volume: 36 Issue: 1, 362 - 381, 01.03.2023
https://doi.org/10.35378/gujs.813138

Abstract

In this paper, Parseval-Goldstein type theorems involving the G ̃n-integral transform which is modified from G_2n-integral transform [7] and the -integral transform [8] are examined. Then, theorems in this paper are shown to yield a number of new identities involving several well-known integral transforms. Using these theorems and their corollaries, a number of interesting infinite integrals of elementary and special functions are presented. Generalizations of Riemann-Liouville and Weyl fractional integral operators are also defined. Some theorems relating generalized Laplace transform, generalized Widder Potential transform, generalized Hankel transform and generalized Bessel transform are obtained. Some illustrative examples are given as applications of these theorems and their results.

References

  • [1] Debnath, L., and Bhatta, D., “Integral Transforms and Their Applications”, 2nd Edition, Chapman Hall/CRC, Boca Raton, FL, (2007).
  • [2] Miller, K.S., and Ross, B., “An Introduction to Fractional Calculus and Fractional Differential Equations”, John Wiley-Interscience Publication, New York, Toronto Singapore, (1993).
  • [3] Podlubny, I., “Fractional Differential Equations: an Introduction to Fractional Derivatives, Fractional Differential Equations, to Methods of Their Solution and Some of Their Applications”, Mathematics in Science and Engineering, Academic Press, London, (1999).
  • [4] Dernek, A.N., and Aylıkcı F., "Some results on the 𝒫ν,2n,𝒦ν,n and Hν,n-integral transforms", Turkish Journal of Mathematics, 41(2): 337-349, (2017). DOI:10.3906/mat-1501-79
  • [5] Yürekli, O., and Sadek, I., "A Parseval-Goldstein type theorem on the Widder potential transform and its applications", International Journal of Mathematics and Mathematical Sciences, 14(3): 517-524, (1991). DOI:10.1155/S0161171291000704
  • [6] Yürekli, O., "Identities on fractional integrals and various integral transforms", Applied Mathematics and Computation, 187: 559-566, (2007). DOI: 10.1016/j.amc.2006.09.001
  • [7] Dernek, N., Aylıkcı, F., and Balaban, G., "New identities for the generalized Glasser transform, the generalized Laplace transform and the ℇ2𝑛,1-transform", IECMSA-IV., Book of Abstracts: 135-138, (2015).
  • [8] Dernek, N., Ölçücü E.Ö., and Aylıkcı, F., "New identities and Parseval type relations for the generalized integral transforms ℒ4n,𝒫4n,ℱs,2n and ℱc,2n", Applied Mathematics and Computation, 269: 536-547, (2015). DOI: 10.1016/j.amc.2015.07.095.
  • [9] Erdelyi, A., Magnus, W., Oberhettinger, F. and Tricomi F.G., “Tables of Integral Transforms. Vol. II”, McGraw-Hill Book Company, Inc., New York-Toronto-London, based, in part, on notes left by Harry Bateman, (1954).
  • [10] Widder, D.V., “An Introduction to Transform Theory”, New York: Academic Press, bibliography: 243-246, (1971).
  • [11] Glasser, M.L., “Some Bessel function integrals”, Kyungpook Mathematical Journal, 13(2): 171-174, (1973).
  • [12] Erdelyi, A., Magnus, W., Oberhettinger, F., and Tricomi, F.G., “Higher Transcendental Functions. Vol. I”, Robert E. Krieger Publishing Co., Inc., Melbourne, Fla., 1981, based on notes left by Harry Bateman, With a preface by Mina Rees, With a foreword by E. C. Watson, Reprint of the (1953) original.
  • [13]Erdelyi, A., Magnus, W., Oberhettinger, F., and Tricomi, F.G., “Higher Transcendental Functions. Vol. II”, Robert E. Krieger Publishing Co., Inc., Melbourne, Fla., 1981, based on notes left by Harry Bateman, Reprint of the (1953) original.
  • [14] Erdelyi, A., Magnus, W., Oberhettinger, F., and Tricomi, F.G., “Tables of Integral Transforms. Vol. I”, McGraw-Hill Book Company, Inc., New York-Toronto-London, (1954), based, in part, on notes left by Harry Bateman.
  • [15]Jangid, K., Parmar, R.K., Agarwal, R., and Purohit, S.D., “Fractional calculus and integral transforms of the product of a general class of polynomial and incomplete Fox–Wright functions”, Advances in Difference Equations, 606: 1-17, (2020). DOI:10.1186/s13662-020-03067-0
  • [16]Agarwal, R., Yadav, M.P., Baleanu, D., and Purohit, S.D., “Existence and uniqueness of miscible flow equation through porous media with a non singular fractional derivative”, AIMS Mathematics, 5(2): 1062–1073, (2020). DOI: 10.3934/math.2020074
  • [17] Song, L., Xu, S., and Yang, Y., “Dynamical models of happiness with fractional order”, Communications in Nonlinear Science and Numerical Simulation, 15(3): 616-628, (2010).
  • [18] De, Gaetano, A., Sakulrang, S., Borri, A., Pitocco, D., Sungnul, S., and Moore, E.J., “Modeling continuous glucose monitoring with fractional differential equations subject to shocks”, Journal of Theoretical Biology, 526: 110776, (2021).
  • [19] Shen, W.Y., Chu,Y.M., ur, Rahman, M., Mahariq, I., and Zeb, A., “Mathematical analysis of HBV and HCV co-infection model under nonsingular fractional order derivative”, Results in Physics, 28: 104582, (2021).
  • [20] Jafari, H., Ganji, R.M., Nkomo, N.S., and Lv, Y.P.A., “Numerical study of fractional order population dynamics model”, Results in Physics, 27: 104456, (2021).
There are 20 citations in total.

Details

Primary Language English
Subjects Engineering
Journal Section Mathematics
Authors

Durmuş Albayrak 0000-0002-3786-5900

Nese Dernek 0000-0003-2148-2152

Publication Date March 1, 2023
Published in Issue Year 2023 Volume: 36 Issue: 1

Cite

APA Albayrak, D., & Dernek, N. (2023). Some Relations for the Generalized G ̃n,P ̃n Integral Transforms and Riemann-Liouville, Weyl Integral Operators. Gazi University Journal of Science, 36(1), 362-381. https://doi.org/10.35378/gujs.813138
AMA Albayrak D, Dernek N. Some Relations for the Generalized G ̃n,P ̃n Integral Transforms and Riemann-Liouville, Weyl Integral Operators. Gazi University Journal of Science. March 2023;36(1):362-381. doi:10.35378/gujs.813138
Chicago Albayrak, Durmuş, and Nese Dernek. “Some Relations for the Generalized G ̃n,P ̃n Integral Transforms and Riemann-Liouville, Weyl Integral Operators”. Gazi University Journal of Science 36, no. 1 (March 2023): 362-81. https://doi.org/10.35378/gujs.813138.
EndNote Albayrak D, Dernek N (March 1, 2023) Some Relations for the Generalized G ̃n,P ̃n Integral Transforms and Riemann-Liouville, Weyl Integral Operators. Gazi University Journal of Science 36 1 362–381.
IEEE D. Albayrak and N. Dernek, “Some Relations for the Generalized G ̃n,P ̃n Integral Transforms and Riemann-Liouville, Weyl Integral Operators”, Gazi University Journal of Science, vol. 36, no. 1, pp. 362–381, 2023, doi: 10.35378/gujs.813138.
ISNAD Albayrak, Durmuş - Dernek, Nese. “Some Relations for the Generalized G ̃n,P ̃n Integral Transforms and Riemann-Liouville, Weyl Integral Operators”. Gazi University Journal of Science 36/1 (March 2023), 362-381. https://doi.org/10.35378/gujs.813138.
JAMA Albayrak D, Dernek N. Some Relations for the Generalized G ̃n,P ̃n Integral Transforms and Riemann-Liouville, Weyl Integral Operators. Gazi University Journal of Science. 2023;36:362–381.
MLA Albayrak, Durmuş and Nese Dernek. “Some Relations for the Generalized G ̃n,P ̃n Integral Transforms and Riemann-Liouville, Weyl Integral Operators”. Gazi University Journal of Science, vol. 36, no. 1, 2023, pp. 362-81, doi:10.35378/gujs.813138.
Vancouver Albayrak D, Dernek N. Some Relations for the Generalized G ̃n,P ̃n Integral Transforms and Riemann-Liouville, Weyl Integral Operators. Gazi University Journal of Science. 2023;36(1):362-81.