{"name":"createBoseBush","title":"Create an orthogonal array using the Bose-Bush algorithm.","pagetitle":"Create an orthogonal array using the Bose-Bush algorithm. — createBoseBush","aliases":"createBoseBush","author":[],"keywords":[],"description":"

The bosebush program\nproduces OA( 2q^2, k, q, 2 ), k <= 2q+1, for powers of 2, q=2^r.

","usage":"createBoseBush(q, ncol, bRandom = TRUE)","arguments":[{"name":"q","description":"

the number of symbols in the array

"},{"name":"ncol","description":"

number of parameters or columns

"},{"name":"bRandom","description":"

should the array be randomized

"}],"has_args":true,"examples":"# NOT RUN {\nA <- createBoseBush(4, 3, FALSE)\nB <- createBoseBush(8, 3, TRUE)\n# }\n","sections":[],"value":"

an orthogonal array

","details":"

From Owen: An orthogonal array A is a matrix of n rows, k\ncolumns with every element being one of q symbols\n0,...,q-1. The array has strength t if, in every n by t\nsubmatrix, the q^t possible distinct rows, all appear\nthe same number of times. This number is the index\nof the array, commonly denoted lambda. Clearly,\nlambda*q^t=n. The notation for such an array is OA( n, k, q, t ).

","references":"

Owen, Art. Orthogonal Arrays for: Computer Experiments, Visualizations, and Integration in high dimenstions. http://lib.stat.cmu.edu/designs/oa.c. 1994\nR.C. Bose and K.A. Bush (1952) Annals of Mathematical Statistics, Vol 23 pp 508-524.

","seealso":"

Other methods to create orthogonal arrays [createBush()],\n[createBose()], [createAddelKemp()], [createAddelKemp3()],\n[createAddelKempN()], [createBusht()], [createBoseBushl()]

","package":{"package":"lhs","version":"1.1.1"}}

Description

Usage

Arguments

Value

Details

References

See Also

Examples