Acyclic and unicyclic graphs whose minimum skew rank is equal to the minimum skew rank of a diametrical path

The minimum skew rank of a simple graph G over the field of real numbers, is the smallest possible rank among all real skew-symmetric matrices whose (i,j)-entry (for i not equal to j) is nonzero whenever {i, j} is an edge in G and is zero otherwise. In this paper we give an algorithm for computing the minimum skew rank of a connected unicyclic graph, and classify all connected acyclic and connected unicyclic graphs G, for which the minimum skew rank of G is equal to the minimum skew rank of P, where P is a diametrical path of G.