A version of Putinar's Positivstellensatz for cylinders

Abstract

We prove that, under some additional assumption, Putinar's Positivstellensatz holds on cylinders of type S × R with S = \x ∈ Rn | g1(x) 0, ..., gs(x) 0\ such that the quadratic module generated by g1, ..., gs in R[X1, ..., Xn] is archimedean, and we provide a degree bound for the representation of a polynomial f ∈ R[X1, ..., Xn, Y] which is positive on S × R as an explicit element of the quadratic module generated by g1, ..., gs in R[X1, ..., Xn, Y]. We also include an example to show that an additional assumption is necessary for Putinar's Positivstellensatz to hold on cylinders of this type.