研究者業績

五十嵐 岳

イガラシ ガク  (Gaku Igarashi)

基本情報

所属
学習院大学 経済学部 経済学科 教授
学位
博士(経済学)(2015年3月 北海道大学)

J-GLOBAL ID
201801015816778773
researchmap会員ID
B000310225

研究キーワード

 1

論文

 13
  • Gaku Igarashi
    Journal of Nonparametric Statistics 35(2) 323-354 2023年  査読有り
    In regression discontinuity design (RDD), the continuity of the density of a running variable is required. Hence, a discontinuity test of density is used for RDD. In previous studies, tests using difference estimators between the left- and right-hand limits of a density at a (potential) discontinuity point were suggested. In the present paper, a new discontinuity test based on direct density ratio estimation using a beta kernel is proposed. By using the ratio estimator in the proposed test statistic, rather than a difference estimator, the characteristic form of the asymptotic variance of the test statistic is obtained. Consequently, the power of the proposed test is shown to increase when used as a one-tailed test. Simulation studies illustrate the larger power of the proposed test when used as a one-tailed test.
  • Igarashi, G., Kakizawa, Y.
    Journal of Nonparametric Statistics 32(3) 617-647 2020年5月  査読有り
  • Igarashi, G.
    Statistics 54(2) 257-280 2020年3月  査読有り
    A new nonparametric density ratio estimator using the beta kernel is proposed. It is shown that the beta kernel density ratio estimator (KDRE) is free of boundary or tail bias, and the asymptotic properties of the beta KDRE are derived. Simulation studies are conducted to illustrate the finite sample performance of the beta KDRE.
  • Igarashi, G., Kakizawa, Y.
    Computational Statistics and Data Analysis 141 40-61 2020年1月  査読有り
    Multiplicative bias correction technique is revisited for asymmetric kernel density estimators (KDEs) when the data is nonnegative or bounded. It is crucial to classify the recently developed asymmetric KDEs into two types. The multiplicative bias correction applied to the non two-regime type is shown to effectively reduce the order of the bias, at the expense of a constant-factor inflation of the variance. However, it is revealed that, in common with other bias corrections, the multiplicative bias correction applied to the two-regime type fails in reducing the bias near the boundary, unless the density to be estimated satisfies the shoulder condition. (C) 2019 Elsevier B.V. All rights reserved.
  • Igarashi, G., Kakizawa, Y.
    Communications in Statistics - Theory and Methods 47(20) 4905-4937 2018年10月  査読有り
    The Amoroso kernel density estimator (Igarashi and Kakizawa 2017) for non-negative data is boundary-bias-free and has the mean integrated squared error (MISE) of order O(n(- 4/5)), where n is the sample size. In this paper, we construct a linear combination of the Amoroso kernel density estimator and its derivative with respect to the smoothing parameter. Also, we propose a related multiplicative estimator. We show that the MISEs of these bias-reduced estimators achieve the convergence rates n(- 8/9), if the underlying density is four times continuously differentiable. We illustrate the finite sample performance of the proposed estimators, through the simulations.
  • Igarashi, G., Kakizawa, Y.
    Journal of Nonparametric Statistics 30(3) 598-639 2018年7月  査読有り
    We consider density estimation for nonnegative data using generalised gamma density. What is being emphasised here is that a negative exponent is allowed. We show that, for each positive or negative exponent, (i) generalised gamma kernel density estimator, without bias reduction, has the mean integrated squared error (MISE) of order O(n-4/5), as in other boundary-bias-free density estimators from the existing literature, and that (ii) the bias-reduced versions have the MISEs of order O(n-4/5), where n is the sample size. We illustrate the finite sample performance of the proposed estimators through the simulations.
  • Gaku Igarashi
    Sankhya A 80(2) 1-20 2018年2月2日  査読有り
    This paper suggests a multivariate asymmetric kernel density estimation using a multivariate weighted log-normal (LN) kernel for non-negative multivariate data. Asymptotic properties of the multivariate weighted LN kernel density estimator are studied. Simulation studies are also conducted in the bivariate situation.
  • Yoshihide Kakizawa, Gaku IgaraShi
    JOURNAL OF THE KOREAN STATISTICAL SOCIETY 46(2) 194-207 2017年6月  査読有り
    This paper considers a varying asymmetric kernel estimation of the density f for non negative data. Regardless of f(0) = 0 or f (0) > 0, it is important to give a good varying shape/scale parameter for the inverse gamma (IGam) kernel, due to the problem of (f) over cap (0) = 0 in some existing literature. After reformulating the IGam kernel density estimator, asymptotic properties like mean, integrated squared error, mean integrated absolute error, strong consistency, and asymptotic normality are investigated in detail, under some conditions on the target density f. Simulation studies are conducted to compare the proposed IGam kernel density estimators with the existing gamma kernel density estimators. (C) 2016 The Korean Statistical Society. Published by Elsevier B.V. All rights reserved.
  • Gaku Igarashi
    JOURNAL OF NONPARAMETRIC STATISTICS 28(1) 1-30 2016年1月  査読有り
    The beta kernel estimator for a density with support [GRAPHICS] was discussed by Chen [(1999) 'Beta Kernel Estimators for Density Functions', Computational Statistics and Data Analysis, 31, 131-145]. In this paper, when the underlying density has a fourth-order derivative, we improve the beta kernel estimator using the bias correction techniques based on two beta kernel estimators with different smoothing parameters. As a result, we propose new bias corrected beta kernel estimators involving the digamma functions, and then establish their asymptotic properties. Simulation studies are conducted to illustrate the finite sample performance of the proposed estimators.
  • Gaku Igarashi
    COMMUNICATIONS IN STATISTICS-THEORY AND METHODS 45(22) 6670-6687 2016年  査読有り
    The log-normal (LN) kernel estimator of a density with support [0, ) was discussed by Jin and Kawczak (2003). The contribution of this paper is to suggest a new class of LN kernel estimators using the idea of weighted distribution. The asymptotic properties of the new class of estimators are studied. Also, numerical studies based on both simulated and real data set are presented.
  • Gaku Igarashi, Yoshihide Kakizawa
    JOURNAL OF STATISTICAL PLANNING AND INFERENCE 159 37-63 2015年4月  査読有り
    Several asymmetric kernel (AK) estimators of a density with support [0, infinity) have been suggested in the recent fifteen years. In this paper, additive and nonnegative bias correction techniques, originally developed for the standard kernel estimator, are applied to some AK estimators when the underlying density has a fourth order derivative. The major contribution is to study asymptotic properties of new AK estimators corresponding to the limits of improved estimators. Simulation studies are conducted to illustrate the finite sample performance of the proposed estimators. (C) 2014 Elsevier B.V. All rights reserved.
  • Gaku Igarashi, Yoshihide Kakizawa
    JOURNAL OF NONPARAMETRIC STATISTICS 26(1) 61-84 2014年1月  査読有り
  • Gaku Igarashi, Yoshihide Kakizawa
    STATISTICS & PROBABILITY LETTERS 84 235-246 2014年1月  査読有り
    We reveal the boundary bias problem of Birnbaum-Saunders, inverse Gaussian, and reciprocal inverse Gaussian kernel estimators (Jin and Kawczak, 2003; Scaillet, 2004) and re-formulate these estimators to solve the problem. We investigate asymptotic properties of a new class of asymmetric kernel estimators. (C) 2013 Elsevier B.V. All rights reserved.

講演・口頭発表等

 28

所属学協会

 2

共同研究・競争的資金等の研究課題

 2