Algebraic Graph Theory Seminar - Shahla Nasserasr
Title: Distinct Eignvalues and Sensitivity
Speaker: | Shahla Nasserasr |
Affiliation: | Rochester Institute of Technology |
Zoom: | Contact Soffia Arnadottir |
Abstract:
For a graph $G$, the class of real-valued symmetric matrices whose zero-nonzero pattern of off-diagonal entries is described by the adjacencies in $G$ is denoted by $S(G)$. The inverse eigenvalue problem for the multiplicities of the eigenvalues of $G$ is to determine for which ordered list of positive integers $m_1\geq m_2\geq \cdots\geq m_k$ with $\sum_{i=1}^{k} m_i=|V(G)|$, there exists a matrix in $S(G)$ with distinct eigenvalues ${\lambda_1,\lambda_2,\cdots, \lambda_k}$ such that $\lambda_i$ has multiplicity $m_i$.