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PARTIALLY MOMENT RELATIONS FOR THE PRODUCT MOMENTS OF ORDER STATISTICS FROM THE STANDARD TWO-SIDED POWER DISTRIBUTION

Yıl 2017, Cilt: 10 Sayı: 1, 14 - 23, 31.01.2017

Öz

In this work, moment relations for the product moments of order statistics from the standard two-sided power (STSP) distribution are obtained. Since the probability density function (pdf) of the STSP distribution is a piecewise function, we consider the pieces separately and develop certain moment relations based on these pieces. Also, the usefulness of these moment relations in evaluating the product moments of order statistics from the STSP distribution is discussed.

Kaynakça

  • Arnold, B.C., Balakrishnan, N. and Nagaraja H.N. (1992). A First Course in Order Statistics. John Wiley, New York.
  • Balakrishnan, N., Malik, H.J. and Ahmet, S.E. (1988). Recurrence relations and identities for moments of order statistics II: Speci c continuous distributions. Commun. Statist. - Theo. Meth., 17, 2657-2694.
  • Cetinkaya, C . and Genc, A_I. (2016). Moments of order statistics of the standard two-sided power distribution, Submitted for publication.
  • David, H.A. and Nagaraja, H.N. (2003). Order Statistics, 3rd edn. John Wiley and Sons, New York.
  • Genc, A_I. (2012). Moments of order statistics of Topp-Leone distribution. Statistical Papers, 53, 117-131.
  • Khan, A.H., Parvez, S. and Yaqub, M. (1983). Recurrence relations between product moments of order statistics. Journal of Statistical Planning and Inference, 8, 175-183.
  • Kotz, S. and Van Dorp, J.R. (2004). Beyond Beta: Other Continuous Families of Distributions with Bounded Support and Applications, Singapure, World Scienti c.
  • Nagaraja, H.N. (2013). Moments of order statistics and L-Moments for the symmetrical triangular distribution. Statistics and Probability Letters, 83, 2357-2363.
  • Thomas, P.Y. and Samuel, P (2008). Recurrence relations for the moments of order statistics from a beta distribution. Statistical Papers, 49, 139-146.
  • Van Dorp, J.R. and Kotz, S. (2002). The standard two-sided power distribution and its properties: With applications in nancial engineering. The American Statistican, 56, 90-99.
Yıl 2017, Cilt: 10 Sayı: 1, 14 - 23, 31.01.2017

Öz

Kaynakça

  • Arnold, B.C., Balakrishnan, N. and Nagaraja H.N. (1992). A First Course in Order Statistics. John Wiley, New York.
  • Balakrishnan, N., Malik, H.J. and Ahmet, S.E. (1988). Recurrence relations and identities for moments of order statistics II: Speci c continuous distributions. Commun. Statist. - Theo. Meth., 17, 2657-2694.
  • Cetinkaya, C . and Genc, A_I. (2016). Moments of order statistics of the standard two-sided power distribution, Submitted for publication.
  • David, H.A. and Nagaraja, H.N. (2003). Order Statistics, 3rd edn. John Wiley and Sons, New York.
  • Genc, A_I. (2012). Moments of order statistics of Topp-Leone distribution. Statistical Papers, 53, 117-131.
  • Khan, A.H., Parvez, S. and Yaqub, M. (1983). Recurrence relations between product moments of order statistics. Journal of Statistical Planning and Inference, 8, 175-183.
  • Kotz, S. and Van Dorp, J.R. (2004). Beyond Beta: Other Continuous Families of Distributions with Bounded Support and Applications, Singapure, World Scienti c.
  • Nagaraja, H.N. (2013). Moments of order statistics and L-Moments for the symmetrical triangular distribution. Statistics and Probability Letters, 83, 2357-2363.
  • Thomas, P.Y. and Samuel, P (2008). Recurrence relations for the moments of order statistics from a beta distribution. Statistical Papers, 49, 139-146.
  • Van Dorp, J.R. and Kotz, S. (2002). The standard two-sided power distribution and its properties: With applications in nancial engineering. The American Statistican, 56, 90-99.
Toplam 10 adet kaynakça vardır.

Ayrıntılar

Birincil Dil İngilizce
Bölüm Araştırma Makalesi
Yazarlar

Çağatay Çetinkaya

Ali İ. Genç Bu kişi benim

Yayımlanma Tarihi 31 Ocak 2017
Kabul Tarihi 29 Aralık 2016
Yayımlandığı Sayı Yıl 2017 Cilt: 10 Sayı: 1

Kaynak Göster

APA Çetinkaya, Ç., & Genç, A. İ. (2017). PARTIALLY MOMENT RELATIONS FOR THE PRODUCT MOMENTS OF ORDER STATISTICS FROM THE STANDARD TWO-SIDED POWER DISTRIBUTION. Istatistik Journal of The Turkish Statistical Association, 10(1), 14-23.
AMA Çetinkaya Ç, Genç Aİ. PARTIALLY MOMENT RELATIONS FOR THE PRODUCT MOMENTS OF ORDER STATISTICS FROM THE STANDARD TWO-SIDED POWER DISTRIBUTION. IJTSA. Ocak 2017;10(1):14-23.
Chicago Çetinkaya, Çağatay, ve Ali İ. Genç. “PARTIALLY MOMENT RELATIONS FOR THE PRODUCT MOMENTS OF ORDER STATISTICS FROM THE STANDARD TWO-SIDED POWER DISTRIBUTION”. Istatistik Journal of The Turkish Statistical Association 10, sy. 1 (Ocak 2017): 14-23.
EndNote Çetinkaya Ç, Genç Aİ (01 Ocak 2017) PARTIALLY MOMENT RELATIONS FOR THE PRODUCT MOMENTS OF ORDER STATISTICS FROM THE STANDARD TWO-SIDED POWER DISTRIBUTION. Istatistik Journal of The Turkish Statistical Association 10 1 14–23.
IEEE Ç. Çetinkaya ve A. İ. Genç, “PARTIALLY MOMENT RELATIONS FOR THE PRODUCT MOMENTS OF ORDER STATISTICS FROM THE STANDARD TWO-SIDED POWER DISTRIBUTION”, IJTSA, c. 10, sy. 1, ss. 14–23, 2017.
ISNAD Çetinkaya, Çağatay - Genç, Ali İ. “PARTIALLY MOMENT RELATIONS FOR THE PRODUCT MOMENTS OF ORDER STATISTICS FROM THE STANDARD TWO-SIDED POWER DISTRIBUTION”. Istatistik Journal of The Turkish Statistical Association 10/1 (Ocak 2017), 14-23.
JAMA Çetinkaya Ç, Genç Aİ. PARTIALLY MOMENT RELATIONS FOR THE PRODUCT MOMENTS OF ORDER STATISTICS FROM THE STANDARD TWO-SIDED POWER DISTRIBUTION. IJTSA. 2017;10:14–23.
MLA Çetinkaya, Çağatay ve Ali İ. Genç. “PARTIALLY MOMENT RELATIONS FOR THE PRODUCT MOMENTS OF ORDER STATISTICS FROM THE STANDARD TWO-SIDED POWER DISTRIBUTION”. Istatistik Journal of The Turkish Statistical Association, c. 10, sy. 1, 2017, ss. 14-23.
Vancouver Çetinkaya Ç, Genç Aİ. PARTIALLY MOMENT RELATIONS FOR THE PRODUCT MOMENTS OF ORDER STATISTICS FROM THE STANDARD TWO-SIDED POWER DISTRIBUTION. IJTSA. 2017;10(1):14-23.