Irregularities of distribution on two point homogeneous spaces
Abstract
We study the irregularities of distribution on two-point homogeneous spaces. Our main result is the following: let d be the real dimension of a two point homogeneous space M, let ( \ aj\ j=1N,\ xj\ j=1N) be a system of positive weights and points on M and let \[ Dr( x) =Σj=1NajBr(x)(xj)-μ(Br(x)) \] be the discrepancy associated with the ball Br( x) . Then, if d 1(mod4), for any radius 0<r<π/2, we obtain the sharp estimate \[ ∫M( Dr( x) 2+ D2r( x) 2) dμ( x) ≥slant cN-1-1d. \]
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