On large sequential groups

We construct, using $\diamondsuit$, an example of a sequential group $G$ such that the only countable sequential subgroups of $G$ are closed and discrete, and the only quotients of $G$ that have a countable pseudocharacter are countable and Fr\'echet. We also show how to construct such a $G$ with several additional properties (such as make $G^2$ sequential, and arrange for every sequential subgroup of $G$ to be closed and contain a nonmetrizable compact subspace, etc.). Several results about $k_\omega$ sequential groups are proved. In particular, we show that each such group is either locally compact and metrizable or contains a closed copy of the sequential fan. It is also proved that a dense proper subgroup of a non Fr\'echet $k_\omega$ sequential group is not sequential extending a similar observation of T.~Banakh about countable $k_\omega$ groups.