论文信息 - Collision probability between sets of random variables

Collision probability between sets of random variables

We develop the collision probability for a canonical collision problem using a counting procedure based on signed graphs. The result involves Stirling numbers of the second kind and is straightforward to evaluate. Characteristics are discussed in the context of a generalized birthday problem and error of the standard binomial approximation is quantified. The basic solution for two sets is also extended to an arbitrary number of sets.

Michael C. Wendl | M. Wendl

[1] Robert W. Patlovany. U.S. Aviation Regulations Increase Probability of Midair Collisions , 1997 .

[2] C. Soderlund,et al. Contigs built with fingerprints, markers, and FPC V4.7. , 2000, Genome research.

[3] E. Standish,et al. Asteroid 1950 DA's Encounter with Earth in 2880: Physical Limits of Collision Probability Prediction , 2002, Science.

[4] Robin J. Wilson,et al. An Atlas of Graphs , 1999 .

[5] Gary A. Davis. Method for Estimating Effect of Traffic Volume and Speed on Pedestrian Safety for Residential Streets , 1998 .

[6] Rodger Staden,et al. Software for genome mapping by fingerprinting techniques , 1988, Comput. Appl. Biosci..

[7] E. McKinney. Generalized Birthday Problem , 1966 .

[8] Richard A. Epstein,et al. The Theory of Gambling and Statistical Logic , 1968 .