Polynomials nonnegative on the cylinder

Abstract

In 2010, Marshall settled the strip conjecture, according to which every polynomial in R[x,y], nonnegative on the strip [-1,1]×R, is a sum of squares and of squares times 1-x2. We consider affine nonsingular curves C over R with C(R) compact, and study the question whether every f in R[C][y], nonnegative on C(R)×R, is a sum of squares in R[C][y]. We give an affirmative answer under the condition that f has only finitely many zeros in C(R)×R. For C the circle x12+x22=1, we prove the result unconditionally.