Consider an n�n matrix polynomial P(�). A spectral norm distance from P(�) to the set of n � n matrix polynomials that have a given scalar � 2 C as a multiple eigenvalue was introduced and obtained by Papathanasiou and Psarrakos. They computed lower and upper bounds for this distance, constructing an associated perturbation of P(�). In this paper, we extend this result to the case of two given distinct complex numbers �1 and �2. First, we compute a lower bound for the spectral norm distance from P(�) to the set of matrix polynomials that have �1; �2 as two eigenvalues. Then we construct an associated perturbation of P(�) such that the perturbed matrix polynomial has two given scalars �1 and �2 in its spectrum. Finally, we derive an upper bound for the distance by the constructed perturbation of P(�). Numerical examples are provided to illustrate the validity of the method. c⃝
