Abstract
Using the notion of the generating function of a function, we define an operator with whom we manage to build a large family of numbers and polynomials. This technique permits to give the closed formulae and interesting combinatorial identities. Among others, these polynomials are a generalization of the Fubini numbers and polynomials.
Publisher
Centre for Evaluation in Education and Science (CEON/CEES)
Reference22 articles.
1. G. A. Baker. Jr., The existence and convergence of subsequences of Pade approximants, Journal of Mathematical Analysis and Applications, 43(3) (1973), 498-528;
2. G. A. Baker, Jr., P.R. Graves-Morris, The convergence of Sequences of Padé Approximants, Journal of Mathematical Analysis and Applications, 87 (1982), 382-394;
3. G.A. Baker, Jr., Essentials of Padé Approximants, Academic Press, New York, 1975;
4. K.-W. Chen, Inversion of Generating Functions using Determinants, Journal of Integer Sequences, 10 (10) (2007), Article ID: 07.10.5, 10 pages;
5. E. W. Cheney, A. Sharma, Bernstein power series, Canadian Journal of Mathematics, 16 (1964), 241-252;
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