The second immanantal polynomials of Laplacian matrices of unicyclic graphs

Let M=(aij) be a square matrix of order n. The second immanant of M isd2(M)=∑σ∈Snχ(σ)∏t=1natσ(t),where χ is the irreducible character of Sn corresponding to the partition (2,1n−2). Let G be a graph. Denote by L(G) the laplacian matrix of G. The polynomial ϕ(G,x)=d2(xI−L(G))=∑k=0n(−1)kck(G)xn−k is called the second immanantal polynomial of G, where ck(G) is the k-th coeficient of ϕ(G,x). The coefficient ck(G) admit various algebraic and topological interpretations for a graph. Merris first considered the coefficient cn−1(G), and he proposed an open problem: given n and m, can the graph G be determined for which cn−1(G) is a minimum or maximum? In this article, we investigate the problem, and we construct six graph operations each of which changes the value of cn−1(G). Using these graph operations, we determine the bound of cn−1(G) of unicyclic graphs. In particular, we also determined the corresponding extremal graphs.