A1-Euler Characteristic of Low Symmetric Powers and Split Toric Varieties

Abstract

For a smooth, projective scheme X over a field k or any variety X if k has characteristic zero, we compute the compactly supported A1-Euler characteristic of Sym2(X) if char(k) 2 and of Sym3(X) if char(k) 2,3. We do so by extending the definition of a G-equivariant quadratic Euler characteristic first studied by Pajwani-P\'al to arbitrary characteristic and by studying its relation to the A1-Euler characteristic of quotients. As an application, we show that the compactly supported A1-Euler characteristic of Symn(X) agrees with the prediction from the power structure constructed by Pajwani-P\'al for n = 2,3. Furthermore, we compute the compactly supported A1-Euler characteristic of split toric varieties and show that the compactly supported A1-Euler characteristic of all of their symmetric powers agrees with the prediction from the power structure constructed by Pajwani-P\'al.