[1. R. Haberman, Applied partial differential equations with Fourier series and boundary value problems. Pearson Higher Ed, 2012.]Search in Google Scholar
[2. L. C. Evans, Partial differential equations (Providence, ri: American Mathematical Society), 1998.]Search in Google Scholar
[3. M. Abramowitz and I. A. Stegun, Handbook of mathematical functions: with formulas, graphs, and mathematical tables, vol. 55. Courier Corporation, 1965.10.1115/1.3625776]Search in Google Scholar
[4. B. M. Levitan, Generalized translation operators and some of their applications, 1964.]Search in Google Scholar
[5. C. Cesarano, G. M. Cennamo, and L. Placidi, Operational methods for Hermite polynomials with applications, WSEAS Transactions on Mathematics, vol. 13, pp. 925-931, 2014.]Search in Google Scholar
[6. W. Miller, Lie theory and special functions. Academic Press, 1968.]Search in Google Scholar
[7. H. W. Gould, A. Hopper, et al., Operational formulas connected with two generalizations of Hermite polynomials, Duke Mathematical Journal, vol. 29, no. 1, pp. 51-63, 1962.10.1215/S0012-7094-62-02907-1]Search in Google Scholar
[8. P. Appell and J. K. de Fériet, Fonctions Hypergéométriques et Hypersphériques: Polynômes d'Hermite. Paris: Gauthier-Villars, 1926.]Search in Google Scholar
[9. C. Cesarano, Operational methods and new identities for Hermite polynomials, Mathematical Mod- elling of Natural Phenomena, vol. 12, no. 3, pp. 44-50, 2017.10.1051/mmnp/201712304]Search in Google Scholar
[10. C. Cesarano, C. Fornaro, and L. Vazquez, Operational results in bi-orthogonal Hermite functions, Acta Mathematica Universitatis Comenianae, vol. 85, no. 1, pp. 43-68, 2016.]Search in Google Scholar
[11. C. Cesarano, C. Fornaro, and L. Vazquez, A note on a special class of Hermite polynomials, Interna- tional Journal of Pure and Applied Mathematics, vol. 98, no. 2, pp. 261-273, 2015.10.12732/ijpam.v98i2.8]Search in Google Scholar
[12. H. M. Srivastava and Y. B. Cheikh, Orthogonality of some polynomial sets via quasi-monomiality, Applied Mathematics and Computation, vol. 141, no. 2-3, pp. 415-425, 2003.10.1016/S0096-3003(02)00961-X]Search in Google Scholar
[13. G. Dattoli*, S. Lorenzutta, P. Ricci, and C. Cesarano, On a family of hybrid polynomials, Integral Transforms and Special Functions, vol. 15, no. 6, pp. 485-490, 2004.10.1080/10652460412331270634]Search in Google Scholar
[14. C. Cesarano and D. Assante, A note on generalized Bessel functions, International Journal of Math- ematical Models and Methods in Applied Sciences, vol. 7, no. 6, pp. 625-629, 2013.]Search in Google Scholar
[15. C. Cesarano, B. Germano, and P. Ricci, Laguerre-type Bessel functions, Integral transforms and special functions, vol. 16, no. 4, pp. 315-322, 2005.10.1080/10652460412331270629]Search in Google Scholar
[16. C. Cesarano and P. Ricci, The legendre polynomials as a basis for Bessel functions, International Journal of Pure and Applied Mathematics, vol. 111, no. 1, pp. 129-139, 2016.10.12732/ijpam.v111i1.12]Search in Google Scholar
[17. D. Assante, C. Cesarano, C. Fornaro, and L. Vazquez, Higher order and fractional diffusive equations, Journal of Engineering Science and Technology Review, vol. 8, no. 5, pp. 202-204, 2015.10.25103/jestr.085.25]Search in Google Scholar