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DCC
2007
IEEE
2007
IEEE
A sequence approach to linear perfect hash families
A linear (qd, q, t)-perfect hash family of size s in a vector space V of order qd over a field F of order q consists of a set S = {1, . . . , s} of linear functionals from V to F with the following property: for all t subsets X V there exists i S such that i is injective when restricted to F. A linear (qd, q, t)-perfect hash family of minimal size d(t - 1) is said to be optimal. In this paper we extend the theory for linear perfect hash families based on sequences developed by Blackburn and Wild. We develop techniques which we use to construct new optimal linear (q2, q, 5)-perfect hash families and (q4, q, 3)perfect hash families. The sequence approach also explains a relationship between linear (q3, q, 3)-perfect hash families and linear (q2, q, 4)-perfect hash families.
Real-time Traffic| Added | 25 Dec 2009 |
| Updated | 25 Dec 2009 |
| Type | Conference |
| Year | 2007 |
| Where | DCC |
| Authors | Susan G. Barwick, Wen-Ai Jackson |
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