Nahid, Tabinda; Rani, Hari Ponnama Mittag-Leffler based Bessel and Tricomi functions via umbral approach. (English) Zbl 07749695 Rep. Math. Phys. 92, No. 1, 1-17 (2023). MSC: 05A40 33E12 33F10 33C10 44A10 44A20 42A38 33B10 PDFBibTeX XMLCite \textit{T. Nahid} and \textit{H. P. Rani}, Rep. Math. Phys. 92, No. 1, 1--17 (2023; Zbl 07749695) Full Text: DOI
Suhaib, Kamran; Malik, Salman A.; Ilyas, Asim Existence and uniqueness results for a multi-parameters nonlocal diffusion equation. (English) Zbl 07633027 Rep. Math. Phys. 90, No. 2, 203-219 (2022). MSC: 35-XX 34-XX PDFBibTeX XMLCite \textit{K. Suhaib} et al., Rep. Math. Phys. 90, No. 2, 203--219 (2022; Zbl 07633027) Full Text: DOI
Merad, Hadjer; Merghadi, Faycal; Merad, Ahcene Solution of Sakata-Taketani equation via the Caputo and Riemann-Liouville fractional derivatives. (English) Zbl 07566282 Rep. Math. Phys. 89, No. 3, 359-370 (2022). MSC: 81-XX 82-XX PDFBibTeX XMLCite \textit{H. Merad} et al., Rep. Math. Phys. 89, No. 3, 359--370 (2022; Zbl 07566282) Full Text: DOI
Raza, Nusrat; Zainab, Umme The Mittag-Leffler-Legendre polynomials and their Lie-algebraic relations. (English) Zbl 07505718 Rep. Math. Phys. 89, No. 1, 97-129 (2022). MSC: 33E12 33C50 33F10 44A15 PDFBibTeX XMLCite \textit{N. Raza} and \textit{U. Zainab}, Rep. Math. Phys. 89, No. 1, 97--129 (2022; Zbl 07505718) Full Text: DOI
Hulianytskyi, Andrii Subdiffusion equations with a source term and their extensions. (English) Zbl 07505713 Rep. Math. Phys. 89, No. 1, 1-8 (2022). MSC: 35-XX 34-XX PDFBibTeX XMLCite \textit{A. Hulianytskyi}, Rep. Math. Phys. 89, No. 1, 1--8 (2022; Zbl 07505713) Full Text: DOI
Garra, R.; Mainardi, F. Some applications of Wright functions in fractional differential equations. (English) Zbl 1527.34016 Rep. Math. Phys. 87, No. 2, 265-273 (2021). MSC: 34A08 34A25 33C60 PDFBibTeX XMLCite \textit{R. Garra} and \textit{F. Mainardi}, Rep. Math. Phys. 87, No. 2, 265--273 (2021; Zbl 1527.34016) Full Text: DOI arXiv
Kalpakides, Vassilios K.; Charalambopoulos, Antonios On Hamilton’s principle for discrete and continuous systems: a convolved action principle. (English) Zbl 1487.70079 Rep. Math. Phys. 87, No. 2, 225-248 (2021). MSC: 70H25 49K05 49K21 49S05 26A33 35A15 PDFBibTeX XMLCite \textit{V. K. Kalpakides} and \textit{A. Charalambopoulos}, Rep. Math. Phys. 87, No. 2, 225--248 (2021; Zbl 1487.70079) Full Text: DOI arXiv
Costa, F. S.; de Oliveira, E. Capelas; Plata, Adrian R. G. Fractional diffusion with time-dependent diffusion coefficient. (English) Zbl 1488.35556 Rep. Math. Phys. 87, No. 1, 59-79 (2021). MSC: 35R11 26A36 PDFBibTeX XMLCite \textit{F. S. Costa} et al., Rep. Math. Phys. 87, No. 1, 59--79 (2021; Zbl 1488.35556) Full Text: DOI
Bouzenna, Fatma El-Ghenbazia; Korichi, Zineb; Meftah, Mohammed Tayeb Solutions of nonlocal Schrödinger equation via the Caputo-Fabrizio definition for some quantum systems. (English) Zbl 1527.81069 Rep. Math. Phys. 85, No. 1, 57-67 (2020). MSC: 81Q80 34L40 34A08 26A33 PDFBibTeX XMLCite \textit{F. E. G. Bouzenna} et al., Rep. Math. Phys. 85, No. 1, 57--67 (2020; Zbl 1527.81069) Full Text: DOI
Singla, Komal; Rana, M. Symmetries, explicit solutions and conservation laws for some time space fractional nonlinear systems. (English) Zbl 1496.35438 Rep. Math. Phys. 86, No. 2, 139-156 (2020). MSC: 35R11 26A33 PDFBibTeX XMLCite \textit{K. Singla} and \textit{M. Rana}, Rep. Math. Phys. 86, No. 2, 139--156 (2020; Zbl 1496.35438) Full Text: DOI
Bock, Wolfgang; da Silva, Jose Luis; Streit, Ludwig Fractional periodic processes: properties and an application of polymer form factors. (English) Zbl 1441.60028 Rep. Math. Phys. 85, No. 2, 267-280 (2020). MSC: 60G22 82D60 82C41 PDFBibTeX XMLCite \textit{W. Bock} et al., Rep. Math. Phys. 85, No. 2, 267--280 (2020; Zbl 1441.60028) Full Text: DOI arXiv
Fan, Zhenbin; Mophou, Gisèle Existence of optimal controls for a semilinear composite fractional relaxation equation. (English) Zbl 1311.49004 Rep. Math. Phys. 73, No. 3, 311-323 (2014). MSC: 49J15 49J27 34A08 26A33 PDFBibTeX XMLCite \textit{Z. Fan} and \textit{G. Mophou}, Rep. Math. Phys. 73, No. 3, 311--323 (2014; Zbl 1311.49004) Full Text: DOI
Bhrawy, A. H.; Baleanu, D. A spectral Legendre-Gauss-Lobatto collocation method for a space-fractional advection diffusion equations with variable coefficients. (English) Zbl 1292.65109 Rep. Math. Phys. 72, No. 2, 219-233 (2013). MSC: 65M70 35R11 35K57 65M20 65L06 PDFBibTeX XMLCite \textit{A. H. Bhrawy} and \textit{D. Baleanu}, Rep. Math. Phys. 72, No. 2, 219--233 (2013; Zbl 1292.65109) Full Text: DOI
Kadem, Abdelouahab; Luchko, Yury; Baleanu, Dumitru Spectral method for solution of the fractional transport equation. (English) Zbl 1237.82041 Rep. Math. Phys. 66, No. 1, 103-115 (2010). MSC: 82C70 PDFBibTeX XMLCite \textit{A. Kadem} et al., Rep. Math. Phys. 66, No. 1, 103--115 (2010; Zbl 1237.82041) Full Text: DOI