On random quadratic forms: supports of potential local maxima

Abstract

In the late eighties John Kingman studied the problem of maxima of a quadratic form, with independent, uniformly distributed, coefficients, on a simplex of growing dimension n. In particular, he proved that the largest support size (cardinality) Ln of a potential local maximum is, in probability, 2.49 n1/2 at most, and for a non-biological case of independent exponentials on [0,∞) he reduced the constant to 2.14. In this paper we show that the constant 2.14 serves a broad class of the densities on [0,1], which includes a linear non-decreasing (whence uniform) density and the exponential density conditioned on [0,1]. We also prove a qualitatively matching lower bound: in probability, Ln 2n1/3 at least. Our argument shows also that the random counts of potential maxima supports, whose sizes range from 2 to 2n1/3, are asymptotic to their expected values. Finally we show that a support of a local maximum, that does not contain a support of a local equilibrium, is very unlikely to have size exceeding 22 n.