Restriction of Fourier transforms to some complex curves

Abstract

The purpose of this paper is to prove a Fourier restriction estimate for certain 2-dimensional surfaces in 2d, d 3. These surfaces are defined by a complex curve γ(z) of simple type, which is given by a mapping of the form % \[ z γ (z) = (z, \, z2,..., \, zd-1, \, φ(z) ) \] % where φ(z) is an analytic function on a domain ⊂ . This is regarded as a real mapping z=(x,y) γ(x,y) from ⊂ 2 to 2d. Our results cover the case φ(z) = zN for any nonnegative integer N, in all dimensions d 3. Furthermore, when d=3, we have a uniform estimate, where φ(z) may be taken to be an arbitrary polynomial of degree at most N. These results are analogues of the uniform restricted strong type estimate in BOS3, valid for polynomial curves of simple type and some other classes of curves in d, d 3.