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Abstract
McIntosh and Pryde [4, 5] introduced a notion of joint spectrum γ(A), for commuting n-tuples A = (A 1,…,An ) of bounded linear operators on a Banach space, which has proved to be very useful in certain applications. In this note we investigate the joint spectrum γ(A) for the non-commutative setting, not in full generality, but rather for the particular case of selfadjoint operators Aj ,1≤jL≤n, in a Hilbert space H. For finite dimensional spaces H quite a lot can be said about such sets γ(A). For instance, γ(A) is characterized as precisely those points
which are joint eigenvalues of A and hence,
γ(A)≠Ø if and only if there exists a common joint eigenvector for A. As an application, the general results are applied to the special case of dim(H) = 2 to show that γ(A)≠Ø if and only if the selfadjoint operators Aj ,1≤jL≤n mutually commute. This fact is combined with a recent result from [3] to give various other characterizations of commutativity of systems of (2 × 2) selfadjoint matrices.
∗The support of an Alexander von Humbold Fellowship is gratefully acknowledged.
∗The support of an Alexander von Humbold Fellowship is gratefully acknowledged.
Notes
∗The support of an Alexander von Humbold Fellowship is gratefully acknowledged.