The classification of Boolean degree 1 functions in high-dimensional finite vector spaces

Abstract

We classify the Boolean degree 1 functions of k-spaces in a vector space of dimension n (also known as Cameron-Liebler classes) over the field with q elements for n ≥ n0(k, q). This also implies that two-intersecting sets with respect to k-spaces do not exist for n ≥ n0(k, q). Our main ingredient is the Ramsey theory for geometric lattices.

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