On the Nullstellens\"atze for Stein spaces and C-analytic sets

Abstract

In this work we prove the real Nullstellensatz for the ring O(X) of analytic functions on a C-analytic set X⊂ Rn in terms of the saturation of ojasiewicz's radical in O(X): The ideal I( Z( a)) of the zero-set Z( a) of an ideal a of O(X) coincides with the saturation [] a of ojasiewicz's radical [] a. If Z( a) has `good properties' concerning Hilbert's 17th Problem, then I( Z( a))=[r] a where [r] a stands for the real radical of a. The same holds if we replace [r] a with the real-analytic radical [ra] a of a, which is a natural generalisation of the real radical ideal in the C-analytic setting. We revisit the classical results concerning (Hilbert's) Nullstellensatz in the framework of (complex) Stein spaces. Let a be a saturated ideal of O( Rn) and Y Rn the germ of the support of the coherent sheaf that extends a O Rn to a suitable complex open neighbourhood of Rn. We study the relationship between a normal primary decomposition of a and the decomposition of Y Rn as the union of its irreducible components. If a:= p is prime, then I( Z( p))= p if and only if the (complex) dimension of Y Rn coincides with the (real) dimension of Z( p).