A relation between zip stacks and moduli stacks of truncated local shtukas

Abstract

Let \(G\) be a reductive group over a field \(k\), and let \(μ\) be a cocharacter of \(G\). We prove that Viehmann's double coset spaces associated with \((G, μ)\) are representable by certain Lusztig varieties, and establish a similar result for the mixed characteristic case. This representability enables a comparison between the moduli stacks of truncated local shtukas and zip stacks. Over a perfect field of positive characteristic, we establish a homeomorphism between the coarse moduli stack of \(1-1\)-truncated local \(G\)-shtukas and that of \(G\)-zips, thereby enriching our understanding of zip period maps in the context of Shimura varieties.