Abstract
This paper, on subdominant eigenvalue location of a bordered diagonal matrix, is the mathematical sequel to an accounting paper by Gao et al. (J Bus Financ Acc 40:673–694, 2013). We explore the following characterization of dividend-policy irrelevance (DPI) to equity valuation in a multi-dimensional linear dynamics framework L: DPI occurs under L when discounting the expected dividend stream by a constant interest rate iff that rate is equal to the dominant eigenvalue of the canonical principal submatrix A of L. This is justifiably the ‘latent’ (or gross) rate of return, since the principal submatrix relates the state variables to each other but with dividend retention. We find that DPI reduces to the placement of the maximum eigenvalue of L between the dominant and subdominant eigenvalues of A. We identify a special role, and a lower bound, for the coefficient measuring the year-on-year dividend-on-dividend sensitivity in achieving robust equity valuation (independence of small variations in the dividend policy).
Keywords
- Dividend irrelevance
- Dominant eigenvalue
- Bordered diagonal matrix
- Performance stability
- Dividend-on-dividend sensitivity
Mathematics Subject Classification (2010)
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Ostaszewski, A.J. (2019). Subdominant Eigenvalue Location and the Robustness of Dividend Policy Irrelevance. In: Brzdęk, J., Popa, D., Rassias, T. (eds) Ulam Type Stability . Springer, Cham. https://doi.org/10.1007/978-3-030-28972-0_13
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