The Pythagoras number of a rational function field in two variables

We prove that every sum of squares in the rational function field in two variables $K(X,Y)$ over a hereditarily pythagorean field $K$ is a sum of $8$ squares. More precisely, we show that the Pythagoras number of every finite extension of $K(X)$ is at most $5$. The main ingredients of the proof are a local-global principle for quadratic forms over function fields in one variable over a complete rank-$1$ valued field due to V. Mehmeti and a valuation theoretic characterization of hereditarily pythagorean fields due to L. Br\"ocker.