: the random variable X is distributed as the random variable Y
the distribution in the title is identical with this distribution
the distribution in title is a special case of this distribution
this distribution is a special case of the distribution in the title
this distribution converges to the distribution in the title
the distribution in the title converges to this distribution
Relationship
Distribution
When
Kapur-hypergeometric family
Kemp-Dacey-hypergeometric family (II/10)
McGregor-Banach
reversed form of Uppuluri-Blot
deterministic
References
Blackwell, D., Hodges, J.J., Jr. (1957). Design for the control of selection bias. The Annals of Mathematical Statistics 28, 449-460.
Dacey, M.F. (1972). Some properties of the link magnitude for channel networks and network patterns. Water Resources Research 8, 1106-1111.
Feller, W. (1962) An Introduction to Probability Theory and its Applications. Vol. I. New York: Wiley
Holst, L. (1989). A note on Banach's match box problem. Statistics & Probability Letters 8, 441-443.
Kaucký, J. (1962). Note on the Banach's match-box problem. Matematicko-fyzikálny časopis SAV 1962, 28-35
Kemp, A.W. (1968). A wide class of discrete distributions and the associated differential equations. Sankhyä A, 30, 401-410.
Kotz, S., Johnson, N.L. (1982) Errors in inspection and grading: distributional aspects of screening and hierarchical screening. Communications in Statistics - Theory and Methods 11, 1997-2016.
Moran, P.A.P. (1968). An Introduction to Probability Theory. Oxford; Clarendon
Riordan, J. (1968). Combinatorial Identities. New York: Wiley
Uppuluri, V.R.R., Blot, W.J. (1974). Asymptotic properties of the number of replications of a paired comparison. J. of Applied Probability 11, 43-52.
Wimmer, G., Altmann. (1999). Thesaurus of univariate discrete probability distributions. Stamm; 1. ed (1999), pg 12
: the random variable X is distributed as the random variable Y
the distribution in the title is identical with this distribution
the distribution in title is a special case of this distribution
this distribution is a special case of the distribution in the title
this distribution converges to the distribution in the title
the distribution in the title converges to this distribution
Relationship
Distribution
When
Kapur-hypergeometric family
Kemp-Dacey-hypergeometric family (II/10)
McGregor-Banach
reversed form of Uppuluri-Blot
deterministic
References
Blackwell, D., Hodges, J.J., Jr. (1957). Design for the control of selection bias. The Annals of Mathematical Statistics 28, 449-460.
Dacey, M.F. (1972). Some properties of the link magnitude for channel networks and network patterns. Water Resources Research 8, 1106-1111.
Feller, W. (1962) An Introduction to Probability Theory and its Applications. Vol. I. New York: Wiley
Holst, L. (1989). A note on Banach's match box problem. Statistics & Probability Letters 8, 441-443.
Kaucký, J. (1962). Note on the Banach's match-box problem. Matematicko-fyzikálny časopis SAV 1962, 28-35
Kemp, A.W. (1968). A wide class of discrete distributions and the associated differential equations. Sankhyä A, 30, 401-410.
Kotz, S., Johnson, N.L. (1982) Errors in inspection and grading: distributional aspects of screening and hierarchical screening. Communications in Statistics - Theory and Methods 11, 1997-2016.
Moran, P.A.P. (1968). An Introduction to Probability Theory. Oxford; Clarendon
Riordan, J. (1968). Combinatorial Identities. New York: Wiley
Uppuluri, V.R.R., Blot, W.J. (1974). Asymptotic properties of the number of replications of a paired comparison. J. of Applied Probability 11, 43-52.
Wimmer, G., Altmann. (1999). Thesaurus of univariate discrete probability distributions. Stamm; 1. ed (1999), pg 12