Some properties of associated Stirling numbers.

Zhao, Feng-Zhen

Displaying similar documents to “Some properties of associated Stirling numbers.”

The Abel-type polynomial identities.

Huang, Fengying, Liu, Bolian (2010)

The Electronic Journal of Combinatorics [electronic only]

Similarity:

The Akiyama-Tanigawa transformation.

Merlini, Donatella, Sprugnoli, Renzo, Verri, M.Cecilia (2005)

Integers

Similarity:

On the oscillation of impulsively damped halflinear oscillators.

Graef, John R., Karsai, János (2000)

Electronic Journal of Qualitative Theory of Differential Equations [electronic only]

Similarity:

On a number pyramid related to the binomial, Deleham, Eulerian, MacMahon and Stirling number triangles.

Franssens, Ghislain R. (2006)

Journal of Integer Sequences [electronic only]

Similarity:

Oscillation of solutions of impulsive neutral difference equations with continuous variable.

Wei, Gengping, Shen, Jianhua (2006)

International Journal of Mathematics and Mathematical Sciences

Similarity:

Extensions of the results on powers of $p$ -hyponormal and $log$ -hyponormal operators.

Yang, Changsen, Yuan, Jiangtao (2006)

Journal of Inequalities and Applications [electronic only]

Similarity:

Some recurrence relations for Cauchy numbers of the first kind.

Liu, Hong-Mei, Qi, Shu-Hua, Ding, Shu-Yan (2010)

Journal of Integer Sequences [electronic only]

Similarity:

Asymptotic behavior of solutions of a fourth order linear differential equation

Gary D. Jones (1988)

Czechoslovak Mathematical Journal

Similarity:

Korovkin-type theorems and applications

Nazim Mahmudov (2009)

Open Mathematics

Similarity:

Let {T n} be a sequence of linear operators on C[0,1], satisfying that {T n (e i)} converge in C[0,1] (not necessarily to e i) for i = 0,1,2, where e i = t i. We prove Korovkin-type theorem and give quantitative results on C 2[0,1] and C[0,1] for such sequences. Furthermore, we define King’s type q-Bernstein operator and give quantitative results for the approximation properties of such operators.

The hyperbolic geometry of continued fractions $𝐊 (1 | b_{n})$ .

Short, Ian (2006)

Annales Academiae Scientiarum Fennicae. Mathematica

Similarity: