Regression analysis is a statistical analysis to predict or explain the relationship between the response variable and one or more explanatory variables. The simplest and most commonly used regression analysis is linear regression. Copula regression is often used as an alternative method to overcome the problem of violating the assumptions of the linear regression model. The advantage of using copula regression is that the response variable does not have to follow a certain distribution and copula regression can explain nonlinear relationships. In this study, the copula used is the Gaussian copula and the student’s t copula. The main objective of this study is to compare the results of linear regression analysis with copula regression on financial data. In the linear regression method, the objective is to determine the estimated value of the response variable and to analyze the effect of macroeconomic factors on BMRI’s stock price. Meanwhile, copula regression was used to estimate the copula parameters using the Maximum Likelihood Estimation method and to determine the estimated value of the response variable using the Monte Carlo method. The measure of the accuracy of the model used is MAPE (Mean Absolute Percentage Error). This study uses financial data consisting of BMRI stock price data as response variables, as well as IHSG and the rupiah exchange rate as explanatory variables. The results showed that the MAPE values for linear regression and copula regression were small and not significantly different, meaning that both regressions were quite good in modeling financial data.

Linear Regression; Gaussian Copula; Student’s t Copula; Copula Regression

R. S. Pindyck and D. L. Rubinfeld, Econometrics Models and Economic Forecast. Singapore: MC Graw Hill, 1998.

S. T. Nurrizqi, Analisis Pengaruh Faktor Makroekonomi terhadap Imbal Hasil Saham Sektor Keuangan. Bogor: IPB University, 2020.

L. Hakim, Studi Simulasi Pembandingan Regresi Generalized Linear Model dan Regresi Berbasis Copula. Bogor: IPB University, 2021.

D. Darwis, Analisis Hubungan dan Prediksi Indeks Harga Saham Gabungan dengan Faktor Makroekonomi melalui Pendekatan Copula. Bogor: IPB University, 2016.

G. Masarotto and C. Varin, “Gaussian copula marginal regression,” Electronic Journal of Statistics, vol. 6, no. none, jan 2012, doi: http://dx.doi.org/10.1214/12-EJS721.

A. R. Parsa and S. A. Klugman, “Copula Regression,” Casualty Actuarial Society, vol. 5, no. 1, pp. 46–50, 2011.

I. R. Hikmah, Identifikasi Struktur Dependensi dan Prediksi Indeks Harga Saham Gabungan dengan Pendekatan C-V Vine Copula. Bogor: IPB University, 2017.

I. S. Bramantya, R. Budiarti, and I. G. P. Purnaba, “Pemodelan Indeks Harga Saham Gabungan dan Penentuan Rank Correlation dengan Menggunakan Copula,” in Prosiding Seminar Nasional Matematika, Statistika, Pendidikan Matematika, dan Komputasi, 2014, pp. 502– 512.

N. Metropolis and S. Ulam, “The Monte Carlo Method,” Journal of the American Statistical Association, vol. 44, no. 247, pp. 335–341, sep 1949, doi: http://dx.doi.org/10.1080/01621459. 1949.10483310.

R. B. Nelsen, An Introduction to Copulas, ser. Springer Series in Statistics. New York, NY: Springer New York, 2006, doi: http://dx.doi.org/10.1007/0-387-28678-0.

J. Rank, “Copulas: From theory to application in Finance,” 2006.

H. Joe, Multivariate Models and Multivariate Dependence Concepts. London: Crc Press, 1997.

K. P. Burnham and D. R. Anderson, “Multimodel Inference,” Sociological Methods & Research, vol. 33, no. 2, pp. 261–304, nov 2004, doi: http://dx.doi.org/10.1177/0049124104268644.

G. A. Rinadi, L. R. Sasongko, and B. Susanto, “Regresi Median Pada Copula Bivariat,” JTAM — Jurnal Teori dan Aplikasi Matematika, vol. 3, no. 1, pp. 07–14, apr 2019, doi: http://dx.doi.org/10.31764/jtam.v3i1.728.

W. Wei, Time Series Analysis: Univariate and Multivariate Methods. New York: Addison- Wesley Publishing Company, Inc., 1990.

S. A. Klugman, H. H. Panjer, and G. E. Willmot, Loss Models: Further Topics. Canada: John Willey & Sons, Inc, 2013.

L. Zhang and V. P. Singh, “Non-Archimedean Copulas,” in Copulas and their Applications in Water Resources Engineering. Cambridge University Press, jan 2019, pp. 261–303, doi: http://dx.doi.org/10.1017/9781108565103.008.

Q. Zhang, V. P. Singh, J. Li, F. Jiang, and Y. Bai, “Spatio-temporal variations of precipitation extremes in Xinjiang, China,” Journal of Hydrology, vol. 434-435, no. 7, pp. 7–18, apr 2012, doi: http://dx.doi.org/10.1016/j.jhydrol.2012.02.038.