Balanced incomplete block designs and related designs
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The read would be well advised to have knowledge of primWe roots and residua classes modultb primes, as well as of finite Gcllois ficlde5, necessary to understand the problems of inequality in this paper.Citations
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Journal ArticleDOI
A new table of constant weight codes
TL;DR: The known techniques for constructing constant weight codes are surveyed, and a table of (unrestricted) binary codes of length nl28 is given.
Journal ArticleDOI
Ad Hoc mobility management with uniform quorum systems
Zygmunt J. Haas,Ben Liang +1 more
TL;DR: The average cost, due to call loss and location updates using such systems, is analyzed in the presence of database disconnections and the tradeoff between the system reliability and the cost of location updates in the UQS scheme is investigated.
Book ChapterDOI
Constructions and Uses of Pairwise Balanced Designs
TL;DR: A pairwise balanced block design (PBD) of index unity was introduced by BOSE, Shrikhande & Parker [4] and H. Hanani [9] as discussed by the authors.
Journal ArticleDOI
Coding techniques for handling failures in large disk arrays
TL;DR: This paper addresses the problem of designing erasure-correcting binary linear codes that protect against the loss of data caused by disk failures in large disk arrays, and describes how such codes can be used to encode data in disks, and gives a simple method for data reconstruction.
Journal ArticleDOI
Some combinational constructions for optical orthogonal codes
TL;DR: In this paper, some combinatorial constructions for optimal (v, k, 1) optical orthogonal codes are developed and the constructions are also used to derive a bulk of new optical orthOGonal codes.
References
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Book
Statistical Tables for Biological, Agricultural and Medical Research
R. A. Fisher,Frank Yates +1 more
TL;DR: Sir Ronald A. Fisher and Frank Yates: Statistical Tables for Biological, Agricultural and Medical Research.
Book
History of the Theory of Numbers
Abstract: THE third and concluding volume of Prof. Dickson's great work deals first with the arithmetical. theory of binary quadratic forms. A long chapter on the class-number is contributed by Mr. G. H. Cresse. Next comes an account of existing knowledge on quadratic forms in three or more variables, followed by chapters on cubic forms, Hermitian and bilinear forms, and modular invariants and covariants.History of the Theory of Numbers.Prof. Leonard Eugene Dickson. Vol. 3: Quadratic and Higher Forms. With a Chapter on the Class Number by G. H. Cresse. (Publication No. 256.) Pp. v + 313. (Washington: Carnegie Institution, 1923.) 3.25 dollars.