On Sums of Products of Bernoulli Variables and Random Permutations

Joffe, A.; Marchand, Éric; Perron, François; Popadiuk, Paul

doi:10.1023/b:jotp.0000020485.34082.8c

Cited by 21 publications

(15 citation statements)

References 9 publications

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“…an unpublished manuscript of Diaconis, ChernHwang-Yeh [4] (which derives approximations via several probability distances), Móri [11] (which uses generating functions), Joffe-Marchand-Perron-Popadiuk [8] (which gives a formula for the 1-string count in a general finite independent Bernoulli sequence in terms of a nonhomogeneous Markov chain and which uses generating functions), and references therein in these and the above papers.…”

Section: Introductionmentioning

confidence: 99%

A study of counts of Bernoulli strings via conditional Poisson processes

Huffer

Sethuraman

2008

Proc. Amer. Math. Soc.

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Abstract. A sequence of random variables, each taking values 0 or 1, is called a Bernoulli sequence. We say that a string of length d occurs in a Bernoulli sequence if a success is followed by exactly (d − 1) failures before the next success. The counts of such d-strings are of interest, and in specific independent Bernoulli sequences are known to correspond to asymptotic d-cycle counts in random permutations.In this paper, we give a new framework, in terms of conditional Poisson processes, which allows for a quick characterization of the joint distribution of the counts of all d-strings, in a general class of Bernoulli sequences, as certain mixtures of the product of Poisson measures. In particular, this general class includes all Bernoulli sequences considered in the literature, as well as a host of new sequences.

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Section: Introductionmentioning

confidence: 99%

A study of counts of Bernoulli strings via conditional Poisson processes

Huffer

Sethuraman

2008

Proc. Amer. Math. Soc.

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“…Consequences of this are, that the d-marked T k 's is a Poisson process Π d with intensity Hahlin [6] derived the distribution of M 1 . In a number of papers M 1 and related random variables have been studied by different methods, see for example [4], [7], [8], [12], [14] and [16], and the references in these papers. The random variables M 1 , M 2 , ... also occur in connection with random permutations and Ewens Sampling Formula, see [1], [2] and [5].…”

Section: Counts Of Non-records Between Recordsmentioning

confidence: 99%

A note on records in a random sequence

Holst

2011

Ark. Mat.

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“…In Section 2 we derive a general recurrence (Lemma 1) for the probability generating function (PGF) of S n using a conditioning argument (as in [7,Proposition 1]). We then proceed to more explicit representations (Corollary 1) for the particular case of multinomial rows (as in Example 1), which will lead to an explicit expression (Theorem 1) for the probability mass function of S n in the identically distributed case.…”

Section: Example 2 (Independent Columns and P(xmentioning

confidence: 99%

“…r = 1 or as pertaining to the marginal distribution of Z j ) has generated much recent interest, analysis, and interpretation; see [4], [5], [6], [7], [9], and [10], among others. Although our main interest relates to cases where the Z j s are not independent, it is worthwhile here summarizing results that may be inferred in cases where the columns are independent.…”

Section: Introductionmentioning

confidence: 99%

On the number of runs for Bernoulli arrays

Aoudia

Marchand

2010

J. Appl. Probab.

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We introduce and motivate the study of (n + 1) × r arrays X with Bernoulli entries X k,j and independently distributed rows. We study the distribution of S n = r j =1 n k=1 X k,j X k+1,j , which denotes the number of consecutive pairs of successes (or runs of length 2) when reading the array down the columns and across the rows. With the case r = 1 having been studied by several authors, and permitting some initial inferences for the general case r > 1, we examine various distributional properties and representations of S n for the case r = 2, and, using a more explicit analysis, the case of multinomial and identically distributed rows. Applications are also given in cases where the array X arises from a Pólya sampling scheme.

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On Sums of Products of Bernoulli Variables and Random Permutations

Cited by 21 publications

References 9 publications

A study of counts of Bernoulli strings via conditional Poisson processes

A study of counts of Bernoulli strings via conditional Poisson processes

A note on records in a random sequence

On the number of runs for Bernoulli arrays

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