| Abstract: | We consider minimax-bias M-estimation of a location parameter in a Kolmogorov neighbourhood K() of a normal distribution. The maximum asymptotic bias of M-estimators for the Kolmogorov normal neighbourhood is derived, and its relation with the gross-error sensitivity of the estimator at the nominal model (the Gaussian case) is found. In addition, efficient bias-robust M-estimators Ti are constructed. Numerical results are also obtained to show the percentage of increase in maximum asymptotic bias and the efficiency we can achieve for some well-known -functions. |
