On an oscillatory integral involving a homogeneous form

Abstract

Let F ∈ R[x1, …, xn] be a homogeneous form of degree d > 1 satisfying (n - VF*) > 4, where VF* is the singular locus of V(F) = \ z ∈ Cn: F(z) = 0 \. Suppose there exists x0 ∈ (0,1)n (V(F) VF*). Let t = (t1, …, tn) ∈ Rn. Then for a smooth function :Rn → R with its support contained in a small neighbourhood of x0, we prove | ∫0∞ ·s ∫0∞ (x) x1i t1 ·s xni tn e2 π i τ F(x) d x | \ 1, |τ|-1 \, where the implicit constant is independent of τ and t.