Difference between revisions of "User:Richard Pinch/sandbox-17"
From Encyclopedia of Mathematics
(Start article: Combinatorial species) |
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A class of finite labelled stuctures closed under relabelling. A contravariant [[functor]] from the [[category]] $\mathcal B$ of finite sets and bijections to the category $\mathcal F$ of finite sets and functions. A species $R$ thus determines the following data. | A class of finite labelled stuctures closed under relabelling. A contravariant [[functor]] from the [[category]] $\mathcal B$ of finite sets and bijections to the category $\mathcal F$ of finite sets and functions. A species $R$ thus determines the following data. | ||
− | *For a finite set $V$, a finite set $R[V]$, thought of as the $R$-structures with labels in $V$. | + | *For a finite set $V$, a finite set $R[V]$, thought of as the $R$-structures with labels in $V$. We write $R[n]$ for $R[\{1,\ldots,n\}]$. |
− | We write $R[n]$ for $R[\{1,\ldots,n\}]$. | + | *For a bijection $f: V \rightarrow W$, a map $R[f] : R[V] \rightarrow R[W]$, with the properties that $R[\mathrm{id}_V] = \mathrm{id}_{R[V]}$ and $R[f\circ g] = R[f] \circ R[g]$. |
− | *For a bijection $f: V \rightarrow W$, a map $R[f] : R[V] \rightarrow R[W]$, with the properties | ||
− | that $R[\mathrm{id}_V] = \mathrm{id}_{R[V]}$ and $R[f\circ g] = R[f] \circ R[g]$. | ||
The ''(exponential) generating function'' of $R$ is the [[formal power series]] | The ''(exponential) generating function'' of $R$ is the [[formal power series]] |
Revision as of 15:30, 22 July 2021
Combinatorial species
A class of finite labelled stuctures closed under relabelling. A contravariant functor from the category $\mathcal B$ of finite sets and bijections to the category $\mathcal F$ of finite sets and functions. A species $R$ thus determines the following data.
- For a finite set $V$, a finite set $R[V]$, thought of as the $R$-structures with labels in $V$. We write $R[n]$ for $R[\{1,\ldots,n\}]$.
- For a bijection $f: V \rightarrow W$, a map $R[f] : R[V] \rightarrow R[W]$, with the properties that $R[\mathrm{id}_V] = \mathrm{id}_{R[V]}$ and $R[f\circ g] = R[f] \circ R[g]$.
The (exponential) generating function of $R$ is the formal power series $$ R(x) = \sum_{n=0}^\infty \frac{|R[n]|}{n!} x^n $$
How to Cite This Entry:
Richard Pinch/sandbox-17. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Richard_Pinch/sandbox-17&oldid=51761
Richard Pinch/sandbox-17. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Richard_Pinch/sandbox-17&oldid=51761