View More View Less
  • 1 Marquette University, Milwaukee, Wisconsin 53201-1881, USA
  • 2 University of Wisconsin-Milwaukee, Milwaukee, Wisconsin 53201, USA
Restricted access

Purchase article

USD  $25.00

1 year subscription (Individual Only)

USD  $800.00

A characterization of power function distribution based on the distribution of spacings is presented here extending the existing characterizations of the uniform distribution in this direction.

  • [1]

    Athar, H. and Faizan, M., Moments of lower generalized order statistics from power function distribution and its characterization, International J. of Statistical Sciences, 11 (2011), 125134.

    • Search Google Scholar
    • Export Citation
  • [2]

    David, H., Order Statistics, Wiley & Sons, New York (1981).

  • [3]

    Gather, U., Kamps, U. and Schweitzer, N., Characterizations of distributions via identically distributed functions of order statistics, Order Statistics: Theory and Methods, Handbook of Statist., North-Holland, Amsterdam 16 (1998), 257290.

    • Search Google Scholar
    • Export Citation
  • [4]

    Hamedani, G. G. and Volkmer, H., Certain characterizations of the uniform distribution, Metrika, 61 (2005), 117125.

  • [5]

    Kamps, U., A characterization of uniform distributions by subranges and its extension to generalized order statistics, Metron, 54 (1996), 3744.

    • Search Google Scholar
    • Export Citation
  • [6]

    Tavangar, M., Power function distribution characterized by dual generalized order statistics, J. of Iranian Statistical Society, 10 (2011), 13-27.

    • Search Google Scholar
    • Export Citation
  • [7]

    Tavangar, M. and Asadi, M., Some new characterization results on exponential and related distributions, Bull. of Iranian Mathematical Society, 36 (2010), 257272.

    • Search Google Scholar
    • Export Citation
  • [8]

    Shimizu, R. and Huang, J.S., On a characteristic property of the uniform distribution, Ann. Inst. Statist. Math. Part A, 35 (1983), 9194.

    • Search Google Scholar
    • Export Citation
  • [9]

    Volkmer, H. and Hamedani, G. G., On distribution of order statistics and their applications to uniform distribution, Metrika, 74 (2011), 287295.

    • Search Google Scholar
    • Export Citation

The author instruction is available in PDF.

Please, download the file from HERE

Manuscript submission: HERE

 

  • Impact Factor (2019): 0.486
  • Scimago Journal Rank (2019): 0.234
  • SJR Hirsch-Index (2019): 23
  • SJR Quartile Score (2019): Q3 Mathematics (miscellaneous)
  • Impact Factor (2018): 0.309
  • Scimago Journal Rank (2018): 0.253
  • SJR Hirsch-Index (2018): 21
  • SJR Quartile Score (2018): Q3 Mathematics (miscellaneous)

Language: English, French, German

Founded in 1966
Publication: One volume of four issues annually
Publication Programme: 2020. Vol. 57.
Indexing and Abstracting Services:

  • CompuMath Citation Index
  • Mathematical Reviews
  • Referativnyi Zhurnal/li>
  • Research Alert
  • Science Citation Index Expanded (SciSearch)/li>
  • SCOPUS
  • The ISI Alerting Services

 

Subscribers can access the electronic version of every printed article.

Senior editors

Editor(s)-in-Chief: Pálfy Péter Pál

Managing Editor(s): Sági, Gábor

Editorial Board

  • Biró, András (Number theory)
  • Csáki, Endre (Probability theory and stochastic processes, Statistics)
  • Domokos, Mátyás (Algebra (Ring theory, Invariant theory))
  • Győri, Ervin (Graph and hypergraph theory, Extremal combinatorics, Designs and configurations)
  • O. H. Katona, Gyula (Combinatorics)
  • Márki, László (Algebra (Semigroup theory, Category theory, Ring theory))
  • Némethi, András (Algebraic geometry, Analytic spaces, Analysis on manifolds)
  • Pach, János (Combinatorics, Discrete and computational geometry)
  • Rásonyi, Miklós (Probability theory and stochastic processes, Financial mathematics)
  • Révész, Szilárd Gy. (Analysis (Approximation theory, Potential theory, Harmonic analysis, Functional analysis))
  • Ruzsa, Imre Z. (Number theory)
  • Soukup, Lajos (General topology, Set theory, Model theory, Algebraic logic, Measure and integration)
  • Stipsicz, András (Low dimensional topology and knot theory, Manifolds and cell complexes, Differential topology)
  • Szász, Domokos (Dynamical systems and ergodic theory, Mechanics of particles and systems)
  • Tóth, Géza (Combinatorial geometry)

STUDIA SCIENTIARUM MATHEMATICARUM HUNGARICA
Gábor Sági
Address: P.O. Box 127, H–1364 Budapest, Hungary
Phone: (36 1) 483 8344 ---- Fax: (36 1) 483 8333
E-mail: smh.studia@renyi.mta.hu