A new two-parametric weighted generalized inaccuracy measure

ASOKAN, M. V., AND SANKARAN, P. G. (2014). Parametric regression models using reversed hazard rates. Journal of Probability and Statistics, 1-5. https://doi.org/10.1155/2014/645719 Search in Google Scholar

BELIS, M., AND GUIASU, S. (1968). A quantitative-qualitative measure of information in cybernetic systems (Corresp.). IEEE Transactions on Information Theory, 14(4), 593-594. Search in Google Scholar

CALÌ, C., LONGOBARDI, M., AND NAVARRO, J. (2020). Properties for generalized cumulative past measures of information. Probability in the Engineering and Informational Sciences, 34(1), 92-111. Search in Google Scholar

DI CRESCENZO, A. (2000). Some results on the proportional reversed hazards model. Statistics and probability letters, 50(4), 313-321. Search in Google Scholar

DI CRESCENZO, A., AND LONGOBARDI, M. (2007). On weighted residual and past entropies. arXiv preprint math/0703489. Search in Google Scholar

DI CRESCENZO A., KAYAL S., TOOMAJ A. (2019) A past inaccuracy measure based on the reversed relevation transform. Metrika 82:607–631 Search in Google Scholar

EBRAHIMI, N., SOOFI, E. S., AND SOYER, R. (2010). Information measures in perspective. International Statistical Review, 78(3), 383-412. Search in Google Scholar

GUPTA, R. C., AND GUPTA, R. D. (2007). Proportional reversed hazard rate model and its applications. Journal of statistical planning and inference, 137(11), 3525-3536. Search in Google Scholar

KUMAR, V., SRIVASTAVA, R., AND TANEJA, H. C. (2010). Length biased weighted residual inaccuracy measure. Metron, 68, 153-160. Search in Google Scholar

KAYAL S., SUNOJ S. M., RAJESH G. (2017) On dynamic generalized measures of inaccuracy. Statistica 77:133–148 Search in Google Scholar

KUNDU, C., NANDA, A. K., AND MAITI, S. S. (2010). Some distributional results through past entropy. Journal of statistical planning and inference, 140(5), 1280-1291. Search in Google Scholar

KERRIDGE, D. F. (1961). Inaccuracy and inference. Journal of the Royal Statistical Society. Series B (Methodological), 184-194. Search in Google Scholar

KAPUR, J. N. (1968, August). Information of order α and type β . In Proceedings of the Indian Academy of Sciences-Section A (Vol. 68, No. 2, pp. 65-75). New Delhi: Springer India. Search in Google Scholar

KAYAL, S., SUNOJ, S. M.: Generalized Kerridge’s inaccuracy measure for conditionally specified models. Commun. Stat., Theory Methods 46 (2017), 8257–8268. Search in Google Scholar

KAYAL, S., MOHARANA, R. AND SUNOJ, S. M. (2019). Quantile-based study of (dynamic) inaccuracy measures, Prob. in the Eng. and Inf. Sci. doi.org/10.1017/S0269964819000019. Search in Google Scholar

KUNDU, D., AND GUPTA, R. D. (2010). A class of bivariate models with proportional reversed hazard marginals. Sankhya B, 72(2), 236-253. Search in Google Scholar

KUNDU, C., DI CRESCENZO, A., AND LONGOBARDI, M. (2016). On cumulative residual (past) inaccuracy for truncated random variables. Metrika, 79(3), 335-356. Search in Google Scholar

MULAYATH VARIYATH, A., AND SANKARAN, P. G. (2014). Parametric regression models using reversed hazard rates. Journal of Probability and Statistics, 2014. Search in Google Scholar

NATH, P. (1968). Inaccuracy and coding theory. Metrika, 13(1), 123-135. Search in Google Scholar

RÉNYI, A. (1961, January). On measures of entropy and information. In Proceedings of the Fourth Berkeley Symposium on Mathematical Statistics and Probability, Volume 1: Contributions to the Theory of Statistics (Vol. 4, pp. 547-562). University of California Press. Search in Google Scholar

SANKARAN, P. G., AND GLEEJA, V. L. (2008). Proportional reversed hazard and frailty models. Metrika, 68, 333-342. Search in Google Scholar

SENGUPTA, D. AND NANDA, A.K. (2011). The proportional reversed hazards regression model. Journal of Statistical Theory and Applications, 18(4), 461-476. Search in Google Scholar

SHANNON, C. E. (1948). A mathematical theory of communication. The Bell system technical journal, 27(3), 379-423. Search in Google Scholar

TANEJA, H. C., KUMAR, V., AND SRIVASTAVA, R. (2009). A dynamic measure of inaccuracy between two residual lifetime distributions. In International Mathematical Forum (Vol. 4, No. 25, pp. 1213-1220). Search in Google Scholar

UNNIKRISHNAN N.N., SANKARAN, P.G. AND SUNOJ, S.M. (2018). Some properties of proportional reversed hazards model based on quantile functions. International Journal of Reliability, Quality and Safety Engineering. https://doi.org/10.1142/S0218539319500116 Search in Google Scholar