Continuous Homomorphism And Cauchy Sequences
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Continuous Homomorphism And Cauchy Sequences
Definition: Let $G$ be a topological abelian group (written additively) such that $0 \in G$ has a countable fundamental system of neighborhoods. A Cauchy sequence in $G$ is defined as a sequence $(x_{n})_{n \in N}$ of elements of $G$ such that for every neighborhood $U$ of $0$ there exists an integer $s = s(U) $ such that $ x_{n} - x_{m} \in U $ for all $n,m \geq s$.
Let $ f \ \colon G \longrightarrow H $ be a continuous homomorphism between topological abelian groups (written additively). Show that $f$ preserves Cauchy sequences, i.e. the image of a Cauchy sequence in $G$ under $f$ is a Cauchy sequence in $H$.
Let $ f \ \colon G \longrightarrow H $ be a continuous homomorphism between topological abelian groups (written additively). Show that $f$ preserves Cauchy sequences, i.e. the image of a Cauchy sequence in $G$ under $f$ is a Cauchy sequence in $H$.
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