Irregularities of distribution and geometry of planar convex sets

Abstract

We consider a planar convex body C and we prove several analogs of Roth's theorem on irregularities of distribution. When ∂ C is C% 2 regardless of curvature, we prove that for every set PN of N points in T2 we have the sharp bound \[ ∫01∫T2 card( PN( λ C+t) ) -λ 2N C 2~dtdλ≥slant cN1/2\;. \] When ∂ C is only piecewise C2 and is not a polygon we prove the sharp bound% \[ ∫01∫T2 card( PN( λ C+t) ) -λ 2N C 2~dtdλ≥slant cN2/5. \] We also give a whole range of intermediate sharp results between N2/5 and N1/2. Our proofs depend on a lemma of Cassels-Montgomery, on ad hoc constructions of finite point sets, and on a geometric type estimate for the average decay of the Fourier transform of the characteristic function of C.