In this paper the issue of the inversion of a matrix polynomial about a unit root is tackled by restoring to Laurent expansion. The principal-part matrix coefficients associated with a simple and a second order pole are properly characterized and closed-form expressions are derived by virtue of a recent result on partitioned inversion (Faliva and Zoia, 2002). This eventually sheds on the analytical foundation of unit-root econometrics which in turn paves the way to an elegant unified representation theorem for (co)integrated processes up to the second order.
Faliva, M., Zoia, M., Matrix poyinomials and their inversion: the algebraic framework of unit-root econometrics representation theorems, <<STATISTICA>>, 2002; (LXII): 187-202 [http://hdl.handle.net/10807/4589]
Matrix poyinomials and their inversion: the algebraic framework of unit-root econometrics representation theorems
Faliva, Mario;Zoia, Maria
2002
Abstract
In this paper the issue of the inversion of a matrix polynomial about a unit root is tackled by restoring to Laurent expansion. The principal-part matrix coefficients associated with a simple and a second order pole are properly characterized and closed-form expressions are derived by virtue of a recent result on partitioned inversion (Faliva and Zoia, 2002). This eventually sheds on the analytical foundation of unit-root econometrics which in turn paves the way to an elegant unified representation theorem for (co)integrated processes up to the second order.
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