CPS1930 M. Kayanan et al.
            4. Conclusion
               In  this  study,  we  introduced  LEnet  estimator  by  proposing  LARS-LEnet
            algorithm,  and  we  showed  that  LEnet  outperforms  LASSO  and Enet  in  the
            RMSE sense. Simulation study will be employed in future studies to support
            our results.

            References
            1.  Hoerl, A., & Kennard, R. (1970). Ridge regression: Biased estimation for
                nonorthogonal problems. Technometrics, 12, 55–67.
            2.  Tibshirani,  R.  (1998).  Regression  shrinkage  and  selection  via  the  lasso.
                Journal of the Royal Statistical Society: Series B (Methodological), 58(1),
                267-288.
            3.  Zou, H., & Hastie, T. (2003). Regression shrinkage and selection via the
                elastic net, with applications to microarrays. JR Stat Soc Ser B, 67, 301-20.
            4.  Liu,  K.  (1993).  A  new  class  of  biased  estimate  in  linear  regression.
                Communication in Statistics - Theory and Methods, 22, 393–402.
            5.  Efron,  B.,  Hastie,  T.,  Johnstone,  I.,  &  Tibshirani,  R.  (2004).  Least  angle
                regression. The Annals of statistics, 32(2), 407-499.
            6.  Stamey, T., Kabalin, J., McNeal, J., Johnston, I., Freiha, F., Redwine, E., and
                Yang, N. (1989),
                “Prostate  Specific  Antigen  in  the  Diagnosis  and  Treatment  of
                Adenocarcinoma  of  the  Prostate  ii.  Radical  Prostatectomy  Treated
                Patients,” Journal of Urology, 16, 1076–1083.
            7.  Venables, W. N. and Ripley, B. D. (1999) Modern Applied Statistics with S-
                PLUS. Third Edition.
                Springer.






























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