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inverse limit
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(Definition)
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Let $\{ G_i \}_{i=0}^{\infty}$ be a sequence of groups which are related by a chain of surjective homomorphisms $f_i\colon G_i \to G_{i-1}$ such that
Definition 1 The inverse limit of $(G_i,f_i)$ , denoted by $$\varprojlim(G_i,f_i),\quad \text{ or }\quad \varprojlim G_i$$ is the subset of $\prod_{i=0}^{\infty} G_i$ formed by elements satisfying $$(\ g_0,\ g_1,\ g_2,\ g_3,\ \ldots),\ \text{with}\quad g_i\in G_i, \quad f_i(g_i)=g_{i-1}$$
Note: The inverse limit of $G_i$ can be checked to be a subgroup of the product $\prod_{i=0}^{\infty} G_i$ . See below for a more general definition.
Examples:
- Let $p\in\Nats$ be a prime. Let $G_0=\{0\}$ and $G_i=\Ints/p^i\Ints$ . Define the connecting homomorphisms $f_i$ , for $i\geq 2$ , to be ``reduction modulo $p^{i-1}$ '' i.e. $$f_i\colon \Ints/p^i\Ints \to \Ints/p^{i-1}\Ints$$ $$f_i(x \operatorname{mod}p^i)= x \operatorname{mod} p^{i-1}$$ which are obviously surjective homomorphisms. The inverse limit of $(\Ints/p^i\Ints, f_i)$ is called the $p$ -adic integers and denoted by $$\Ints_p=\varprojlim\Ints/p^i\Ints$$
- Let $E$ be an elliptic curve defined over $\Complex$ . Let $p$ be a prime and for any natural number $n$ write $E[n]$ for the $n$ -torsion group, i.e. $$E[n]=\{ Q\in E \mid n\cdot Q=O\}$$ In this case we define $G_i=E[p^i]$ , and $$f_i\colon E[p^i] \to E[p^{i-1}], \quad f_i(Q)=p\cdot Q$$ The inverse limit of $(E[p^i],f_i)$ is called the Tate module of $E$ and denoted $$T_p(E)=\varprojlim E[p^i]$$
The concept of inverse limit can be defined in far more generality. Let $(S,\leq)$ be a directed set and let $\mathcal{C}$ be a category. Let $\{ G_{\alpha}\}_{\alpha\in S}$ be a collection of objects in the category $\mathcal{C}$ and let $$\{f_{\alpha,\beta}\colon G_{\beta} \to G_{\alpha}\mid \alpha,\beta \in S,\quad \alpha\leq\beta \}$$ be a collection of morphisms satisfying:
- For all $\alpha\in S$ , $f_{\alpha,\alpha}=\operatorname{Id}_{G_{\alpha}}$ , the identity morphism.
- For all $\alpha,\beta,\gamma\in S$ such that $\alpha \leq \beta \leq \gamma$ , we have $f_{\alpha,\gamma} = f_{\alpha,\beta} \circ f_{\beta,\gamma}$ (composition of morphisms).
Definition 2 The inverse limit of $(\{G_{\alpha}\}_{\alpha\in S},\{f_{\alpha,\beta}\})$ , denoted by $$\varprojlim (G_{\alpha},f_{\alpha,\beta}),\quad \text{ or }\quad \varprojlim G_{\alpha}$$ is defined to be the set of all $(g_{\alpha})\in \prod_{\alpha\in S} G_{\alpha}$ such that for all $\alpha,\beta \in S$ $$ \alpha\leq\beta \Rightarrow f_{\alpha,\beta}(g_{\beta})=g_{\alpha}$$
For a good example of this more general construction, see infinite Galois theory.
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"inverse limit" is owned by alozano.
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Cross-references: infinite Galois theory, composition, identity, morphisms, objects, collection, category, directed set, Tate module, natural number, elliptic curve, integers, prime, product, subgroup, subset, homomorphisms, surjective, chain, groups, sequence
There are 12 references to this entry.
This is version 7 of inverse limit, born on 2003-08-26, modified 2005-10-08.
Object id is 4655, canonical name is InverseLimit.
Accessed 10704 times total.
Classification:
| AMS MSC: | 20F22 (Group theory and generalizations :: Special aspects of infinite or finite groups :: Other classes of groups defined by subgroup chains) |
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Pending Errata and Addenda
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![$\displaystyle \xymatrix{ {G_0} & {G_1} \ar@{->}[l]_{f_1} & {G_2} \ar@{->}[l]_{f_2} & {G_3} \ar@{->}[l]_{f_3} & {\ldots} \ar@{->}[l]_{f_4}}$](http://images.planetmath.org:8080/cache/objects/4655/js/img1.png "$\displaystyle \xymatrix{ {G_0} & {G_1} \ar@{->}[l]_{f_1} & {G_2} \ar@{->}[l]_{f_2} & {G_3} \ar@{->}[l]_{f_3} & {\ldots} \ar@{->}[l]_{f_4}}$")