Normal vector of a random hyperplane

Abstract

Let v1,...,vn-1 be n-1 independent vectors in Rn (or Cn). We study x, the unit normal vector of the hyperplane spanned by the vi. Our main finding is that x resembles a random vector chosen uniformly from the unit sphere, under some randomness assumption on the vi. Our result has applications in random matrix theory. Consider an n by n random matrix with iid entries. We first prove an exponential bound on the upper tail for the least singular value, improving the earlier linear bound by Rudelson and Vershynin. Next, we derive optimal delocalization for the eigenvectors corresponding to eigenvalues of small modulus.