Optimal nominal interest rate rules are usually set assuming that the underlying world is linear. In this paper, we consider the performance of 'optimal' rules when the underlying relationship between inflation and the output gap may be nonlinear. In particular if the inflation-output trade-off exhibits nonlinearities this will impart a bias to inflation when a linear rule is used. By deriving some analytical results for the higher moments and in particular the skewness of the distribution of output and inflation, we show that the sign of the skewness of the distribution of inflation and output depends upon the nature of the nonlinearity. For the convex modified hyperbolic function used by Chadha et al. (IMF Staff Papers 39(2) (1992) 395) and Schaling (Bank of England Working Paper Series, 1999) inflation is positively and output negatively skewed. Whereas, if a concave-convex form is used the skewness of inflation and output is reversed. To correct this bias we propose a piecewise linear rule, which can be thought of as an approximation to the nonlinear rule of Schaling (1999). In order to evaluate the relevance of these results, we turn to some illustrative empirical results for the US and the UK. We show that this reduces the bias, but at the expense of an increase in the volatility of the nominal interest rate. © 2003 Published by Elsevier B.V.
Corrado, L., Holly, S. (2003). Nonlinear Phillips curves, mixing feedback rules and the distribution of inflation and output. JOURNAL OF ECONOMIC DYNAMICS & CONTROL, 28(3), 467-492 [10.1016/S0165-1889(02)00184-7].
Nonlinear Phillips curves, mixing feedback rules and the distribution of inflation and output
CORRADO, LUISA;
2003-12-01
Abstract
Optimal nominal interest rate rules are usually set assuming that the underlying world is linear. In this paper, we consider the performance of 'optimal' rules when the underlying relationship between inflation and the output gap may be nonlinear. In particular if the inflation-output trade-off exhibits nonlinearities this will impart a bias to inflation when a linear rule is used. By deriving some analytical results for the higher moments and in particular the skewness of the distribution of output and inflation, we show that the sign of the skewness of the distribution of inflation and output depends upon the nature of the nonlinearity. For the convex modified hyperbolic function used by Chadha et al. (IMF Staff Papers 39(2) (1992) 395) and Schaling (Bank of England Working Paper Series, 1999) inflation is positively and output negatively skewed. Whereas, if a concave-convex form is used the skewness of inflation and output is reversed. To correct this bias we propose a piecewise linear rule, which can be thought of as an approximation to the nonlinear rule of Schaling (1999). In order to evaluate the relevance of these results, we turn to some illustrative empirical results for the US and the UK. We show that this reduces the bias, but at the expense of an increase in the volatility of the nominal interest rate. © 2003 Published by Elsevier B.V.File | Dimensione | Formato | |
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