1964
DOI: 10.4153/cmb-1964-015-1
|View full text |Cite
|
Sign up to set email alerts
|

Computation of the Number of Score Sequences in Round-Robin Tournaments

Abstract: We consider round-robin tournaments of n players in which, at each encounter, the winner is awarded 1 point and the loser 0 (ties are excluded).Let1be the n scores, ordered in a non-decreasing sequence. Clearly2

Help me understand this report

Search citation statements

Order By: Relevance

Paper Sections

Select...
2
1
1

Citation Types

0
7
0

Year Published

1971
1971
2022
2022

Publication Types

Select...
6
2

Relationship

0
8

Authors

Journals

citations
Cited by 16 publications
(7 citation statements)
references
References 3 publications
0
7
0
Order By: Relevance
“…The continued fraction (22) was encountered by Ramanujan [24] in the theory of partitions. (See for instance Hardy and Wright [13], p.…”
Section: The Distribution Of Ronmentioning
confidence: 99%
See 1 more Smart Citation
“…The continued fraction (22) was encountered by Ramanujan [24] in the theory of partitions. (See for instance Hardy and Wright [13], p.…”
Section: The Distribution Of Ronmentioning
confidence: 99%
“…In 1968 in studying the continued fraction(22) Szekeres[28] observed that the coefficients fn(n + 2j) in(23)have simple combinatorial interpretations. He proved that fn(n + 2j), where j =0, 1, • • • ,(~), can be interpreted as the number of positive integers at, a2, ... , an satisfying the conditions 1~at~a2~...~an,…”
mentioning
confidence: 99%
“…Let s(n) denote the number of simple score sequences of order n. It is easy to show that s ( n ) satisfies the following recurrence relation, which can be used to evaluate s(n): Table I lists for small values of n the simple score sequences of order n and compares s(n) with t(n), the total number of score sequences of order n, enumerated in [7].…”
Section: Number Of Simple Score Sequencesmentioning
confidence: 99%
“…This test was utilized by Bent [2] in a remarkable 1964 Master of Science dissertation. See also Narayana and Bent [8]. We present Bent's algorithm here because we will need it in later sections.…”
Section: Introductionmentioning
confidence: 99%