Regularized Maximum Likelihood Estimation for the Random Coefficients Model

04/16/2021
by   Emil Mendoza, et al.
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The random coefficients model Y_i=β_0_i+β_1_i X_1_i+β_2_i X_2_i+…+β_d_i X_d_i, with 𝐗_i, Y_i, β_i i.i.d, and β_i independent of X_i is often used to capture unobserved heterogeneity in a population. We propose a quasi-maximum likelihood method to estimate the joint density distribution of the random coefficient model. This method implicitly involves the inversion of the Radon transformation in order to reconstruct the joint distribution, and hence is an inverse problem. Nonparametric estimation for the joint density of β_i=(β_0_i,…, β_d_i) based on kernel methods or Fourier inversion have been proposed in recent years. Most of these methods assume a heavy tailed design density f_𝐗. To add stability to the solution, we apply regularization methods. We analyze the convergence of the method without assuming heavy tails for f_𝐗 and illustrate performance by applying the method on simulated and real data. To add stability to the solution, we apply a Tikhonov-type regularization method.

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