Zero cycles on Severi--Brauer flag varieties

Abstract

Let \(A\) be a central simple algebra over a field \(F\) with index \(n\) and let \(SBr(A)\) denote the \(r\)-th generalized Severi--Brauer variety associated with \(A\). We prove that the Chow group of zero cycles of degree zero \(A0(SBr(A))\) is \((d, n/d)\)-torsion where \(d = (r,n)\). Our approach reduces the general case to division algebras of prime power index and yields several new instances in which \(A0\) is trivial, together with sharper torsion bounds in general.\\ We also show that if \(F\) is a local or global field, then \(A0(SBr(A))=0\). Since Severi--Brauer flag varieties are stably birational to generalized Severi--Brauer varieties, these results extend to them, yielding corresponding torsion bounds and vanishing results for \(A0(X)\), where \(X\) is stably birational to \(SBr(A)\).