Canonical correlation analysis of stochastic trends via functional approximation

Abstract

This paper proposes a novel approach for semiparametric inference on the number s of common trends and their loading matrix in I(1)/I(0) systems. It combines functional approximation of limits of random walks and canonical correlations analysis, performed between the p observed time series of length T and the first K discretized elements of an L2 basis. Tests and selection criteria on s, and estimators and tests on are proposed; their properties are discussed as T and K diverge sequentially for fixed p and s. It is found that tests on s are asymptotically pivotal, selection criteria of s are consistent, estimators of are T-consistent, mixed-Gaussian and efficient, so that Wald tests on are asymptotically Normal or 2. The paper also discusses asymptotically pivotal misspecification tests for checking model assumptions. The approach can be coherently applied to subsets or aggregations of variables in a given panel. Monte Carlo simulations show that these tools have reasonable performance for T≥ 10 p and p≤ 300. An empirical analysis of 20 exchange rates illustrates the methods.

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