An Arithmetic Count of the Lines on a Smooth Cubic Surface

Abstract

We give an arithmetic count of the lines on a smooth cubic surface over an arbitrary field k, generalizing the counts that over C there are 27 lines, and over R the number of hyperbolic lines minus the number of elliptic lines is 3. In general, the lines are defined over a field extension L and have an associated arithmetic type α in L*/(L*)2. There is an equality in the Grothendieck-Witt group GW(k) of k Σlines TrL/k α = 15 · 1 + 12 · -1 , where TrL/k denotes the trace GW(L) GW(k). Taking the rank and signature recovers the results over C and R. To do this, we develop an elementary theory of the Euler number in A1-homotopy theory for algebraic vector bundles. We expect that further arithmetic counts generalizing enumerative results in complex and real algebraic geometry can be obtained with similar methods.