Term structure estimation with liquidity-adjusted Affine Nelson Siegel model: A nonlinear state space approach applied to the Indian bond market

“…Diebold and Li (2006) extended the NS model into a dynamic setting by allowing the NS parameters to vary over time. Referred to as the DNS model, its popularity has only increased since (for a recent survey, see Kumar & Virmani, 2022). The dynamics of the spot rate in the DNS model is given by…”

“…Diebold and Li (2006) extended the NS model into a dynamic setting by allowing the NS parameters to vary over time. Referred to as the DNS model, its popularity has only increased since (for a recent survey, see Kumar & Virmani, 2022). The dynamics of the spot rate in the DNS model is given by $$${y}_{t}(\tau )={\beta }_{0,t}+{\beta }_{1,t}\left(\frac{1-{e}^{-\lambda \tau }}{\lambda \tau }\right)+{\beta }_{2,t}\left(\frac{1-{e}^{-\lambda \tau }}{\lambda \tau }-{e}^{-\lambda \tau }\right),$$$ where $${y}_{t}$$ is the zero‐coupon yield at time $$t$$ with maturity $$\tau $$, and $${\beta }_{0,t},{\beta }_{1,t},{\beta }_{2,t}$$ are often referred to as “factor loadings” (Nelson & Siegel, 1987).…”

“…We cast our dynamic models in a state‐space framework and estimate them using the approach laid out in Kumar and Virmani (2022). We describe the steps for estimation for the DNS model here.…”

Harvesting the volatility smile in a large emerging market: A Dynamic Nelson–Siegel approach

“…Diebold and Li (2006) extended the NS model into a dynamic setting by allowing the NS parameters to vary over time. Referred to as the DNS model, its popularity has only increased since (for a recent survey, see Kumar & Virmani, 2022). The dynamics of the spot rate in the DNS model is given by…”

“…Diebold and Li (2006) extended the NS model into a dynamic setting by allowing the NS parameters to vary over time. Referred to as the DNS model, its popularity has only increased since (for a recent survey, see Kumar & Virmani, 2022). The dynamics of the spot rate in the DNS model is given by $$${y}_{t}(\tau )={\beta }_{0,t}+{\beta }_{1,t}\left(\frac{1-{e}^{-\lambda \tau }}{\lambda \tau }\right)+{\beta }_{2,t}\left(\frac{1-{e}^{-\lambda \tau }}{\lambda \tau }-{e}^{-\lambda \tau }\right),$$$ where $${y}_{t}$$ is the zero‐coupon yield at time $$t$$ with maturity $$\tau $$, and $${\beta }_{0,t},{\beta }_{1,t},{\beta }_{2,t}$$ are often referred to as “factor loadings” (Nelson & Siegel, 1987).…”

“…We cast our dynamic models in a state‐space framework and estimate them using the approach laid out in Kumar and Virmani (2022). We describe the steps for estimation for the DNS model here.…”

Harvesting the volatility smile in a large emerging market: A Dynamic Nelson–Siegel approach