A general theory of minimal increments for Hirsch-type indices and applications to the mathematical characterization of Kosmulski-indices

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Egghe L.
L. Egghe

Abstract

Egghe, L. (2014). A general theory of minimal increments for Hirsch-type indices and applications to the mathematical characterization of Kosmulski-indices. Malaysian Journal of Library & Information ScienceVol.19, no. 3: 41-49.


For a general function f (n) (n =1,2, ...) , defining general Hirsch-type indices, we can characterize the first increment I1 (n) = (n +1) f (n +1) − nf (n) as well as the second increment I2 (n) = I1 (n +1) − I1 (n1 +1). An application is given by presenting mathematical characterizations of Kosmulski-indices.


 

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How to Cite
L., E., & Egghe, L. (2017). A general theory of minimal increments for Hirsch-type indices and applications to the mathematical characterization of Kosmulski-indices. Malaysian Journal of Library and Information Science, 19(3). Retrieved from https://mjs.um.edu.my/index.php/MJLIS/article/view/1783
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