The matrix exponential eAe^AeA is defined by eA=∑k=0∞Akk!e^A = \sum_{k=0}^\infty \frac{A^k}{k!}eA=∑k=0∞k!Ak. For a diagonal matrix D=diag(d1,d2,…,dn)D = \text{diag}(d_1, d_2, \ldots, d_n)D=diag(d1,d2,…,dn), what is eDe^DeD?
diag(ed1,ed2,…,edn)\text{diag}(e^{d_1}, e^{d_2}, \ldots, e^{d_n})diag(ed1,ed2,…,edn)
etr(D)Ie^{\text{tr}(D)} Ietr(D)I
edet(D)Ie^{\det(D)} Iedet(D)I
A generally non-diagonal matrix