Local linear estimator for stochastic differential equations driven by α-stable L\'evy motions
Abstract
We study the local linear estimator for the drift coefficient of stochastic differential equations driven by α-stable L\'evy motions observed at discrete instants letting T → ∞. Under regular conditions, we derive the weak consistency and central limit theorem of the estimator. Compare with Nadaraya-Watson estimator, the local linear estimator has a bias reduction whether kernel function is symmetric or not under different schemes.
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