Power-sequence terraces for \({\mathbb Z}_n\) where \(n\) is an odd prime power
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Publication:1861280
DOI10.1016/S0012-365X(02)00459-4zbMath1035.05026MaRDI QIDQ1861280
Publication date: 16 March 2003
Published in: Discrete Mathematics (Search for Journal in Brave)
Related Items (13)
Narcissistic half-and-half power-sequence terraces for \(\mathbb Z_n\) with \(n=pq^{t}\). ⋮ Some \(\mathbb Z_{n+2}\) terraces from \(\mathbb Z_n\) power-sequences, \(n\) being an odd prime ⋮ Some da capo directed power-sequence \(\mathbb Z _{n+1}\) terraces with \(n\) an odd prime power ⋮ A general approach to constructing power-sequence terraces for \(\mathbb Z_n\) ⋮ A review of uniform cross-over designs ⋮ Combinatorially fruitful properties of \(3\cdot 2^{-1}\) and \(3\cdot 2^{-2}\) modulo \(p\) ⋮ Constructions for Terraces and R-Sequencings, Including a Proof That Bailey's Conjecture Holds for Abelian Groups ⋮ The construction of nearly balanced and nearly strongly balanced uniform cross-over designs ⋮ Construction of some classes of balanced cross-over designs from terraces ⋮ Some power-sequence terraces for \(\mathbb Z_{pq}\) with as few segments as possible ⋮ Sectionable terraces and the (generalised) Oberwolfach problem ⋮ SOMEn−2TERRACES FROMnPOWER-SEQUENCES,nBEING AN ODD PRIME POWER ⋮ Construction of Cross-Over Designs for Comparing Test Treatments with Control Using Terraces
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