Stability and exact Turan numbers for matroids

Abstract

We consider the Tur\'an-type problem of bounding the size of a set M ⊂eq F2n that does not contain a linear copy of a given fixed set N ⊂eq F2k, where n is large compared to k. An Erdos-Stone type theorem [5] in this setting gives a bound that is tight up to a o(2n) error term; our first main result gives a stability version of this theorem, showing that such an M that is close in size to the upper bound in [5] is close in edit distance to the obvious extremal example. Our second result shows that the error term in [5] is exactly controlled by the solution to one of a class of `sparse' extremal problems, and in many cases eliminates the error term completely to give a sharp upper bound on |M|.