On the condition number and perturbation of matrix functions for Hermitian matrices

Consider a matrix function f defined for Hermitian matrices. The purpose of this paper is two-fold. We derive new results for the absolute structured condition number of the matrix function and we derive new bounds for the perturbation ||f(A+E)-f(A)|| expressed in terms of eigenvalues of A and A+E. The results are general and under certain conditions hold for an arbitrary unitarily invariant matrix norm ||\cdot||. We illustrate the use of the formulas with an application to the error analysis of calculations in electronic structure theory.