Fixed point ratios in actions of finite classical groups, I

<p>This is the first in a series of four papers on fixed point ratios in actions of finite classical groups. Our main result states that if <em>G</em> is a finite almost simple classical group and <em>Ω</em> is a faithful transitive non-subspace <em>G</em>-set then either fpr(<em>x</em>)&amp;lesssim;|<em>x</em>^<em>G</em>|^−1/2 for all elements <em>x</em>∈<em>G</em> of prime order, or (<em>G, Ω</em>) is one of a small number of known exceptions. Here fpr(<em>x</em>) denotes the proportion of points in <em>Ω</em> which are fixed by <em>x</em>. In this introductory note we present our results and describe an application to the study of minimal bases for primitive permutation groups. A further application concerning monodromy groups of covers of Riemann surfaces is also outlined.</p>