Some remarks on conditional entropy

A.G.P.M. Nijst

doi:10.1007/BF00538752

Some remarks on conditional entropy

A.G.P.M. Nijst

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Abstract

Using a definition of conditional entropy given by Hanen and Neveu [5, 10, 11] we discuss in this paper some properties of conditional entropy and mean entropy, in particular an integral representation of conditional entropy (§ 2), and the decomposition theorem of the KolmogorovSina¯i invariant (§ 3) (see also [6–8] and [12]). There is an essential difference between Jacob's proof of the last called theorem [6] and the proof given below. The definition of a Lebesgue space, given by Rokhlin [7–9] and [12], is not used in this paper.

Original language	English
Pages (from-to)	307-319
Number of pages	13
Journal	Zeitschrift für Wahrscheinlichkeitstheorie und verwandte Gebiete
Volume	12
Issue number	4
DOIs	https://doi.org/10.1007/BF00538752
Publication status	Published - 1969

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title = "Some remarks on conditional entropy",

abstract = "Using a definition of conditional entropy given by Hanen and Neveu [5, 10, 11] we discuss in this paper some properties of conditional entropy and mean entropy, in particular an integral representation of conditional entropy (§ 2), and the decomposition theorem of the KolmogorovSina¯i invariant (§ 3) (see also [6–8] and [12]). There is an essential difference between Jacob's proof of the last called theorem [6] and the proof given below. The definition of a Lebesgue space, given by Rokhlin [7–9] and [12], is not used in this paper.",

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PY - 1969

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N2 - Using a definition of conditional entropy given by Hanen and Neveu [5, 10, 11] we discuss in this paper some properties of conditional entropy and mean entropy, in particular an integral representation of conditional entropy (§ 2), and the decomposition theorem of the KolmogorovSina¯i invariant (§ 3) (see also [6–8] and [12]). There is an essential difference between Jacob's proof of the last called theorem [6] and the proof given below. The definition of a Lebesgue space, given by Rokhlin [7–9] and [12], is not used in this paper.

AB - Using a definition of conditional entropy given by Hanen and Neveu [5, 10, 11] we discuss in this paper some properties of conditional entropy and mean entropy, in particular an integral representation of conditional entropy (§ 2), and the decomposition theorem of the KolmogorovSina¯i invariant (§ 3) (see also [6–8] and [12]). There is an essential difference between Jacob's proof of the last called theorem [6] and the proof given below. The definition of a Lebesgue space, given by Rokhlin [7–9] and [12], is not used in this paper.

U2 - 10.1007/BF00538752

DO - 10.1007/BF00538752

M3 - Article

SN - 0044-3719

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SP - 307

EP - 319

JO - Zeitschrift für Wahrscheinlichkeitstheorie und verwandte Gebiete

JF - Zeitschrift für Wahrscheinlichkeitstheorie und verwandte Gebiete

IS - 4

ER -

Some remarks on conditional entropy

Abstract

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