Arhangelskiu{i} sheaf amalgamations in topological groups

We consider amalgamation properties of convergent sequences in topological groups and topological vector spaces. The main result of this paper is that, for arbitrary topological groups, Nyikos’s property $\alpha_{1.5}$ is equivalent to Arhangel’ski\u{\i}’s formally stronger property $\alpha_1$. This result solves a problem of Shakhmatov (2002), and its proof uses a new perturbation argument. We also prove that there is a topological space $X$ such that the space $C_p(X)$ of continuous real-valued functions on $X$, with the topology of pointwise convergence, has Arhangel’ski\u{\i}’s property $\alpha_1$ but is not countably tight. This result follows from results of Arhangel’ski\u{\i}–Pytkeev, Moore and Todor\v{c}evi'c, and provides a new solution, with remarkable properties, to a problem of Averbukh and Smolyanov (1968) concerning topological vector spaces. The Averbukh–Smolyanov problem was first solved by Plichko (2009), using Banach spaces with weaker locally convex topologies.