Majorization, Csiszár divergence and Zipf-Mandelbrot law

Latif, Naveed; Pec̆arić, Ðilda; Pečarić, Josip

doi:10.1186/s13660-017-1472-2

Cited by 12 publications

(11 citation statements)

References 23 publications

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“…For more results related Zipf-Mandelbrot entropies, see previous studies. [8][9][10][11][12][13][14][15] Further generalization of Zipf-Mandelbrot entropy is hybrid Zipf-Mandelbrot entropy, 16 which is given by…”

Section: Introduction and Preliminary Resultsmentioning

confidence: 99%

Bounds for Csiszár divergence and hybrid Zipf‐Mandelbrot entropy

Khan

Pec̆arić

Pečarić

2019

Math Methods in App Sciences

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The purpose of this paper is to give a series of inequalities of the Jensen type and their applications for Csiszár divergence. By using these results, we give many estimations for hybrid Zipf-Mandelbrot entropy. KEYWORDSconvex functions, Csiszár divergence, hybrid Zipf-Mandelbrot entropy, Jensen's inequality, Slater's inequality MSC CLASSIFICATION 26D15; 94A17; 94A15 Math Meth Appl Sci. 2019;42:7411-7424. wileyonlinelibrary.com/journal/mma

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Section: Introduction and Preliminary Resultsmentioning

confidence: 99%

Bounds for Csiszár divergence and hybrid Zipf‐Mandelbrot entropy

Khan

Pec̆arić

Pečarić

2019

Math Methods in App Sciences

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“…Even though a large amount of research has been done on majorization theory, from the early works [ 29 , 34 , 38 ] through further developments [ 27 , 30 , 31 , 32 , 36 , 77 , 78 ] to modern applications [ 39 , 40 , 41 ], there is a lack of results on the more general concept of relative majorization. This does not seem to be due to a lack of interest, as can be seen from the results [ 28 , 57 , 58 , 79 ], but mostly because relative majorization looses some of the appealing properties of majorization which makes it harder to deal with, for example that permutations no longer leave the ordering

invariant, in contrast to the case of a uniform prior. This restriction does, however, not affect our application of the concept to decision-making, as permutations are not considered as elementary computations, since they do not diminish uncertainty.…”

Section: Discussionmentioning

confidence: 99%

Bounded Rational Decision-Making from Elementary Computations That Reduce Uncertainty

Gottwald

Braun

2019

Entropy

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In its most basic form, decision-making can be viewed as a computational process that progressively eliminates alternatives, thereby reducing uncertainty. Such processes are generally costly, meaning that the amount of uncertainty that can be reduced is limited by the amount of available computational resources. Here, we introduce the notion of elementary computation based on a fundamental principle for probability transfers that reduce uncertainty. Elementary computations can be considered as the inverse of Pigou-Dalton transfers applied to probability distributions, closely related to the concepts of majorization, T-transforms, and generalized entropies that induce a preorder on the space of probability distributions. As a consequence we can define resource cost functions that are order-preserving and therefore monotonic with respect to the uncertainty reduction. This leads to a comprehensive notion of decision-making processes with limited resources. Along the way, we prove several new results on majorization theory, as well as on entropy and divergence measures.

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“…In recent times, Shannon entropy and Zipf-Mandelbrot law have been the topics of great interest, see for example [1,9,11,12]. The concept of Shannon entropy, the central source of information theory, is sometimes referred to as measure of uncertainty.…”

Section: Introductionmentioning

confidence: 99%