TY  - BOOK
AU  - Ahlam Mohamed Saad Hussein,
AU  - Mahmoud Riad Mahmoud
TI  - Estimation based on the principle of maximum entropy
U1  - 519.5 
PY  - 2024///
KW  - Mathematical Statistics
KW  - Principle of maximum entropy
KW  -  Maximum Likelihood
KW  - Bayes
KW  -  Kumaraswamy distribution
N1  - Thesis (Ph.D)-Cairo University, 2024; Bibliography: pages 77-84; Issues also as CD
N2  - In (1957) Jaynes maximized the entropy using the exact amount of information provided by the data and introduced the approach of the principle of maximum entropy (POME) to estimate the distribution parameters using the information available in the data. Kumaraswamy (1980) introduced the double pounded probability density function which was originally used to model hydrological phenomena. This distribution share several properties with the beta distribution and it has the extra advantages that is possesses a closed form distribution function, but it remained unknown to most statisticians until it was developed by Jones (2009) as a beta-type distribution with some tractability advantages in particular as it has fairly simple quantile function and it has explicit formula for L-Moment.  This thesis proposes using the principle of maximum entropy approach to estimate the parameters of the Kumaraswamy distribution subject to moment constraints. The new estimators for the Kumaraswamy parameters are compared with maximum likelihood and Bayesian estimation methods. A simulation study is performed to investigate the performance of the estimators in terms of their mean square errors and their efficiency; ÙØ¯Ù Shannon  ØªØ¹Ø±ÙÙ Ø§ÙØ§ÙØªØ±ÙØ¨Ù ÙØ£ÙÙ ÙØ±Ø© Ø¹Ø§Ù (1948) ÙÙÙÙØ§Ø³ Ø¹Ø¯Ø¯Ù ÙÙÙØ¹ÙÙÙØ§Øª Ø§ÙÙØªØ§Ø­Ø© Ø¨Ø§ÙØªÙØ²ÙØ¹ Ø§ÙØ¥Ø­ØªÙØ§ÙÙ. ÙÙÙ Ø¹Ø§Ù   1957 ÙØ¯Ù  Jaynes   ÙØ¨Ø¯Ø£ ØªØ¹Ø¸ÙÙ Ø§ÙØ¥ÙØªØ±ÙØ¨Ù principle of maximum entropy (POME) ÙØ§Ø³ØªØ®Ø¯ÙÙ ÙÙ Ø§Ø®ØªÙØ§Ø± Ø§ÙØªÙØ²ÙØ¹ Ø§ÙÙÙØ§Ø³Ø¨ ÙÙ Ø¸Ù Ø§ÙÙØ¹ÙÙÙØ§Øª Ø§ÙÙØªØ§Ø­Ø© Ø§ÙØªÙ ÙØªÙ ØµÙØ§ØºØªÙØ§ ÙÙ ØµÙØ±Ø© ÙÙÙØ¯ constraints. 
ØªÙ Ø§ÙØ¨Ø­Ø« ÙÙ Ø§ÙØ£Ø¯Ø¨ÙØ§Øª Ø§ÙØ¥Ø­ØµØ§Ø¦ÙØ© Ø¹Ù Ø§Ø³ØªØ®Ø¯Ø§Ù Ø¯Ø§ÙØ© Ø§ÙØ¥ÙØªØ±ÙØ¨Ù Ø§ÙØ¹Ø¸ÙÙ (POME) ÙØªÙØ¯ÙØ± Ø§ÙÙØ¹Ø§ÙÙ Ø§ÙÙØ¬ÙÙÙØ© ÙÙØªÙØ²ÙØ¹Ø§Øª Ø§ÙÙØ®ØªÙÙØ© ÙÙ Ø¸Ù ØªÙØ§ÙØ± Ø¨Ø¹Ø¶ Ø§ÙÙØ¹ÙÙÙØ§Øª Ø§ÙØ£ÙÙÙØ©. ÙÙØ¯Ù Ø¥ÙÙØ§ÙÙØ© Ø§Ø³ØªØ®Ø¯Ø§Ù ÙØ¨Ø¯Ø£ ØªØ¹Ø¸ÙÙ Ø§ÙØ¥ÙØªØ±ÙØ¨Ù (POME) ÙÙ ØªÙØ¯ÙØ± Ø§ÙÙØ¹Ø§ÙÙ Ø§ÙÙØ¬ÙÙÙØ© ÙØ¨Ø¹Ø¶ Ø§ÙØªÙØ²ÙØ¹Ø§Øª Ø§ÙØ¥Ø­ØµØ§Ø¦ÙØ© ÙØ«Ù ØªÙØ¯ÙØ± Ø§ÙÙØ¹Ø§ÙÙ Ø§ÙÙØ¬ÙÙÙØ© ÙØªÙØ²ÙØ¹ Kumaraswamy. ÙØ¹ÙÙ ÙÙØ§Ø±ÙØ© Ø¹Ø¯Ø¯ÙØ© Ø¨Ø§Ø³ØªØ®Ø¯Ø§Ù Ø¨ÙØ§ÙØ§Øª ÙÙÙØ¯Ø© ÙØ£Ø³ÙÙØ¨ Ø§ÙÙØ­Ø§ÙØ§Ø© ÙØ¹ Ø¨Ø¹Ø¶ Ø·Ø±Ù Ø§ÙØªÙØ¯ÙØ± Ø§ÙØ£Ø®Ø±Ù ÙØ«Ù Ø·Ø±ÙÙØ© Ø§ÙØ¥ÙÙØ§Ù Ø§ÙØ£ÙØ¨Ø±(ML) ÙØ·Ø±ÙÙØ© Ø¨ÙÙØ² ÙÙ Ø§ÙØªÙØ¯ÙØ±Ø Ø°ÙÙ ÙÙÙÙÙÙ Ø¹ÙÙ Ø¨Ø¹Ø¶ Ø®ØµØ§Ø¦Øµ ÙØªØ§Ø¦Ø¬ Ø§ÙØ¯Ø±Ø§Ø³Ø© Ø§ÙÙØ¸Ø±ÙØ©
ER  -