Abstract
We investigate the behavior of f(d), the least size of a lattice of order dimension d. In particular we show that the lattice of a projective plane of order n has dimension at least n/ln(n), so that f(d)=O(d)2 log2d. We conjecture f(d)=θ(d2), and prove something close to this for height-3 lattices, but in general we do not even know whether f(d)/d→∞.
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