Extensions of Yamamoto-Nayak's Theorem
Abstract
A result of Nayak asserts that m ∞ |Am|1/m exists for each n× n complex matrix A, where |A| = (A*A)1/2, and the limit is given in terms of the spectral decomposition. We extend the result of Nayak, namely, we prove that the limit of m ∞ |BAmC|1/m exists for any n× n complex matrices A, B, and C where B and C are nonsingular; the limit is obtained and is independent of B. We then provide generalization in the context of real semisimple Lie groups.
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