Degree 2 Boolean Functions on Grassmann Graphs

Abstract

We investigate the existence of Boolean degree d functions on the Grassmann graph of k-spaces in the vector space Fqn. For d=1 several non-existence and classification results are known, and no non-trivial examples are known for n ≥ 5. This paper focusses on providing a list of examples on the case d=2 in general dimension and in particular for (n, k)=(6,3) and (n,k) = (8, 4). We also discuss connections to the analysis of Boolean functions, regular sets/equitable bipartitions/perfect 2-colorings in graphs, q-analogs of designs, and permutation groups. In particular, this represents a natural generalization of Cameron-Liebler line classes.