Victoria Powers, Bruce Reznick, Claus Scheiderer, Frank Sottile
Published 2004-05-25Version 1
David Hilbert proved that a non-negative real quartic form f(x,y,z) is the sum of three squares of quadratic forms. We give a new proof which shows that if the complex plane curve Q defined by f is smooth, then f has exactly 8 such representations, up to equivalence. They correspond to those real 2-torsion points of the Jacobian of Q which are not represented by a conjugation-invariant divisor on Q.
Comments: 4 pages
Journal: Comptes Rendus Mathematique (Paris), 339, Issue 9, (2004), 617--620.
An elementary proof of Hilbert's theorem on ternary quartics: Some complements
Geometry of the Discriminant Surface for Quadratic Forms
Real versus complex plane curves
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