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引用次数: 2
摘要
在这一章,我们认为《加泰罗尼亚数字,C n n = n + 1 = 2,还有两个generalizations,加泰罗尼亚的三角区的数字,B n, k和A的n, k, n, k∈n。它们是通过数字和现在感兴趣的属性,如转述公式,生成导电和导电解释。我们时刻》款待这些加泰罗尼亚三角区数字,神盾局,with the跟踪概括:∑k = 1 n k m B - n - j, k, k∑k = n + 1 = 2−1米(3英尺)A n为j, j, k, n∈n和m∈n∪0。为了m和j的一些价值,我们把他们的隐形表情送给他们。交流能力还被考虑为部分权力。另一个著名的基因测序学在第三节中研究,它与加泰罗尼亚三角的数字在第4节中给出。最后,我们在最后一节中收集了一些力矩和替代能力的属性。
In this chapter, we consider the Catalan numbers, C n = 1 n + 1 2 n n , and two of their generalizations, Catalan triangle numbers, B n , k and A n , k , for n , k ∈ N . They are combinatorial numbers and present interesting properties as recursive formulae, generating functions and combinatorial interpretations. We treat the moments of these Catalan triangle numbers, i.e., with the following sums: ∑ k = 1 n k m B n , k j , ∑ k = 1 n + 1 2 k − 1 m A n , k j , for j , n ∈ N and m ∈ N ∪ 0 . We present their closed expressions for some values of m and j . Alternating sums are also considered for particular powers. Other famous integer sequences are studied in Section 3, and its connection with Catalan triangle numbers are given in Section 4. Finally we conjecture some properties of divisibility of moments and alternating sums of powers in the last section.
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