TY - JOUR
T1 - The forecasting efficiency of the dynamic Nelson Siegel model on credit default swaps
AU - Shaw, Frances
AU - Murphy, Finbarr
AU - O'Brien, Fergal
PY - 2014/1
Y1 - 2014/1
N2 - This paper extends the Diebold-Li dynamic Nelson Siegel model to a new asset class, credit default swaps (CDSs). The similarities between the term structure of CDSs and the term structure of interest rates allow CDS curves to be modelled successfully using a parsimonious three factor model as first proposed by Nelson and Siegel (1987). CDSs and yield curves are modelled using the Diebold and Li (2006) dynamic interpretation of the Nelson Siegel model where the three factors are representative of the level, slope and curvature of the curve. Our results show that the CDS curve fits the data well and allows for the various shapes exhibited by the CDS data including steep, inverted and downward sloping curves. In addition to in sample fit of the modelled curve we explore the out of sample forecasting abilities of the model and using a univariate autoregressive model we forecast 1, 5 and 10 days ahead. Our results show that although the one day ahead forecast under performs the random walk, the 5 and 10 day forecast consistently outperforms the random walk for both yields and CDSs. This study reaffirms the ability of the Diebold-Li (2006) methodology to forecast yields and provides new evidence that this methodology is efficacious when applied to CDS spreads.
AB - This paper extends the Diebold-Li dynamic Nelson Siegel model to a new asset class, credit default swaps (CDSs). The similarities between the term structure of CDSs and the term structure of interest rates allow CDS curves to be modelled successfully using a parsimonious three factor model as first proposed by Nelson and Siegel (1987). CDSs and yield curves are modelled using the Diebold and Li (2006) dynamic interpretation of the Nelson Siegel model where the three factors are representative of the level, slope and curvature of the curve. Our results show that the CDS curve fits the data well and allows for the various shapes exhibited by the CDS data including steep, inverted and downward sloping curves. In addition to in sample fit of the modelled curve we explore the out of sample forecasting abilities of the model and using a univariate autoregressive model we forecast 1, 5 and 10 days ahead. Our results show that although the one day ahead forecast under performs the random walk, the 5 and 10 day forecast consistently outperforms the random walk for both yields and CDSs. This study reaffirms the ability of the Diebold-Li (2006) methodology to forecast yields and provides new evidence that this methodology is efficacious when applied to CDS spreads.
KW - Forecasting
KW - Nelson Siegel
KW - Term structure of credit default swaps
UR - http://www.scopus.com/inward/record.url?scp=84888203316&partnerID=8YFLogxK
U2 - 10.1016/j.ribaf.2012.08.007
DO - 10.1016/j.ribaf.2012.08.007
M3 - Article
AN - SCOPUS:84888203316
SN - 0275-5319
VL - 30
SP - 348
EP - 368
JO - Research in International Business and Finance
JF - Research in International Business and Finance
ER -