Abstract
The problem of computing the Laplace transform of composed functions has not found its way into the literature because it was customarily believed that there were no suitable formula to solve it. Actually, it has been shown in previous work that by making use of Bell polynomials, efficient approximations can be found. Moreover, using an extension of Bell’s polynomials to bivariate functions, it is also possible to approximate the Laplace transform of composed functions of two variables. This topic is solved in this paper and some numerical verifications, due to the first author using the computer algebra system Mathematica©, are given proving the effectiveness of the proposed method.
Subject
Geometry and Topology,Logic,Mathematical Physics,Algebra and Number Theory,Analysis
Reference19 articles.
1. Some parametric and argument variations of the operators of fractional calculus and related special functions and integral transformations;Srivastava;J. Nonlinear Convex Anal.,2021
2. Some general families of integral transformations and related results;Srivastava;Appl. Math. Comput. Sci.,2022
3. Oberhettinger, F., and Badii, L. Tables of Laplace Transforms, 1973.
4. Caratelli, D., and Ricci, P.E. Bell’s polynomials and Laplace Transform of higher order nested functions. Symmetry, 2022. 14.
5. Differentiation of multivariable composite functions and Bell polynomials;Noschese;J. Comput. Anal. Appl.,2003
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