Results 111 to 120 of about 502,780 (135)
On Eigenfunction Expansions. [PDF]
Proc Natl Acad Sci U S A, 1953 Mautner FI.
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Rational Singularities for Moment Maps of Totally Negative Quivers. [PDF]
Transform GroupsVernet T.
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A New Class of Hermite-Based Higher Order Central Fubini Polynomials
International Journal of Applied and Computational Mathematics, 2020zbMATH Open Web Interface contents unavailable due to conflicting licenses.
W. Khan, S. Sharma
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Certain properties of 3D degenerate generalized Fubini polynomials and applications
Afrika MatematikazbMATH Open Web Interface contents unavailable due to conflicting licenses.
M. Riyasat, Amal S. Alali, Subuhi Khan
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Fubini polynomials and integer partitions
Contributions Discret. Math., 2021In this paper, we show that the geometric polynomials can be expressed as sums over integer partitions in two different ways. New formulas involving geometric numbers, Bernoulli numbers, and Genocchi numbers are derived in this context.
M. Merca
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Construction of certain new families related to q-Fubini polynomials
Georgian Mathematical Journal, 2022Fubini polynomials play an important role in the theory and applications of mathematics. These polynomials appear in combinatorial mathematics, thus attracted an appreciable amount of interest of number theory and combinatorics experts.
Subuhi Khan, Mehnaz Haneef, M. Riyasat
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Some New Identities on Fubini Polynomials of Higher Order
Pure Mathematics伟明 刘
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2-Variable Fubini-degenerate Apostol-type polynomials
Asian-European Journal of Mathematics, 2021This work deals with the mathematical inspection of a hybrid family of the degenerate polynomials of the Apostol-type. The inclusion of the derivation of few series expansion formulas, explicit representations and difference equations for this hybrid family brings a novelty to the existing literature.
Tabinda Nahid, Cheon Seoung Ryoo
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A Unified Generalization of Touchard and Fubini Polynomial Extensions
2023The paper under review studies the sequence of 8-variable polynomials defined by coefficient extraction as \[\begin{multlined} H_n^{(\lambda,u,p,\delta)}(x;q,\beta,\gamma) = \\ \frac{1}{n!} [t^n] \Biggl( 1+(1-p)u\Biggl[ \frac{(1+(1-q)t)^{\frac{\gamma}{1-q}}}{(1-x((1+(1-q)t)^{\frac{\beta}{1-q}} -1))^{\lambda}} \Biggr] \Biggr)^{\frac{\delta}{1-p}}.
Adell, José A., Nkonkobe, Sithembele
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