• Publications
  • Influence
On the formal arc space of a reductive monoid
Let $X$ be a scheme of finite type over a finite field $k$, and let ${\cal L} X$ denote its arc space; in particular, ${\cal L} X(k)=X(k[[t]])$. Using the theory of Grinberg, Kazhdan, and Drinfeld onExpand
  • 33
  • 5
  • PDF
Erratum to: “On the formal arc space of a reductive monoid”
abstract:We correct the calculation of IC functions on arc spaces of reductive monoids in [Bouthier, Ng\^o, and Sakellaridis, {\it Amer. J. Math.} {\bf 138} (2016), 81--108] which did not account forExpand
  • 1
  • 1