Unit gain graphs with two distinct eigenvalue and systems of lines in complex space

Abstract: Since the introduction of the Hermitian adjacency matrix for digraphs, interest in so-called complex unit gain graphs has surged. In this work, we consider gain graphs whose spectra contain the minimum number of two distinct eigenvalues. Analogously to graphs with few distinct eigenvalues, a great deal of structural symmetry is required for a gain graph to attain this minimum. This allows us to draw a surprising parallel to well-studied systems of lines in complex space, through a natural correspondence to uni… Show more

“…Note that H η (G ± ) coincides with the ordinary adjacency matrix of G ± . We also refer to gain graphs [7,28,32,34,36,41,43], which are a more generalized version of mixed graphs.…”

Combinatorial necessary conditions for regular graphs to induce periodic quantum walks

“…Note that H η (G ± ) coincides with the ordinary adjacency matrix of G ± . We also refer to gain graphs [7,28,32,34,36,41,43], which are a more generalized version of mixed graphs.…”

Combinatorial necessary conditions for regular graphs to induce periodic quantum walks