A uniform space $X$ is complete if every Cauchy filter in $X$ is convergent. Here we do not require $X$ to be Hausdorff.
Question.
Let $G$ be a complete topological group and let $H$ be a topological group. Suppose that $q:G\twoheadrightarrow H$ is an open and surjective homomorphism of topological groups.
Is $H$ complete topological group?
Motivation.
Let $X$ be a topological vector space and let $q:X\twoheadrightarrow X/Y$ be the quotient with respect to some linear subspace $Y \subseteq X$. Then $q$ is open and surjective. Actually every open surjective linear map with domain $X$ is of this form. It is standard result in functional analysis that if $X$ is Banach, then $X/Y$ is a seminormed and complete space (if $Y$ is closed, then $X/Y$ is a Banach space).
