On the Number of Restricted One-to-One and Onto Functons Having Integral Coordinates

Mary Joy R. Latayada
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Abstract

Let $N_m$ be the set of positive integers $1, 2, \cdots, m$ and $S \subseteq N_m$. In 2000, J. Caumeran and R. Corcino made a thorough investigation on counting restricted functions $f_{|S}$ under each of the following conditions:\begin{itemize}\item[(\textit{a})]$f(a) \leq a$, $\forall a \in S$;\item[(\textit{b})] $f(a) \leq g(a)$, $\forall a \in S$ where $g$ is any nonnegative real-valued continuous functions;\item[(\textit{c})] $g_1(a) \leq f(a) \leq g_2(a)$, $\forall a \in S$, where $g_1$ and $g_2$ are any nonnegative real-valued continuous functions.\end{itemize}Several formulae and identities were also obtained by Caumeran using basic concepts in combinatorics.In this paper, we count those restricted functions under condition $f(a) \leq a$, $\forall a \in S$, which is one-to-one and onto, and establish some formulas and identities parallel to those obtained by J. Caumeran and R. Corcino.
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关于具有积分坐标的受限1 - 1和映上函数的个数
设$N_m$为正整数$1, 2, \cdots, m$和$S \subseteq N_m$的集合。2000年,J. Caumeran和R. Corcino在以下条件下对计数限制函数$f_{|S}$进行了深入的研究:\begin{itemize}\item[(\textit{a})]$f(a) \leq a$, $\forall a \in S$;\item[(\textit{b})] $f(a) \leq g(a)$, $\forall a \in S$其中$g$为任意非负实值连续函数;\item[(\textit{c})] $g_1(a) \leq f(a) \leq g_2(a)$, $\forall a \in S$,其中$g_1$和$g_2$为任意非负实值连续函数。\end{itemize}利用组合学的基本概念,用柯曼方法得到了几个公式和恒等式。在$f(a) \leq a$, $\forall a \in S$条件下,我们计算了这些限制函数,它们是一对一和映上的,并建立了一些与J. Caumeran和R. Corcino的公式和恒等式平行的公式和恒等式。
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CiteScore
1.30
自引率
28.60%
发文量
156
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