Balanced fractional \(r^m\times s^n\) factorial designs and their analysis
From MaRDI portal
Publication:1158712
zbMath0473.62063MaRDI QIDQ1158712
Publication date: 1981
Published in: Hiroshima Mathematical Journal (Search for Journal in Brave)
balancednessoptimalitytracedeterminantasymmetrical arraysmultidimensional relationshipsodd resolution designs
Related Items (9)
Optimal partially balanced fractional \(2^{m_ 1+m_ 2}\) factorial designs of resolution IV ⋮ Balanced fractional factorial designs of resolution \(2\ell +1\) for interesting effects orthogonal to some nuisance parameters: \(2^{m_ 1+m_ 2}\) series ⋮ A-optimal partially balanced fractional \(2^{m_ 1+m_ 2}\) factorial designs of resolution V, with \(4\leq m_ 1+m_ 2\leq 6\) ⋮ On some partially balanced fractional \(2^{m_ 1+m_ 2}\) factorial designs of resolution VI ⋮ Fractional factorial designs of two and three levels ⋮ On existence and construction of balanced arrays ⋮ Some existence conditions for partially balanced arrays with 2 symbols ⋮ GA-optimal partially balanced fractional \(2^{m_1+m_2}\) factorial designs of resolutions \(\mathrm{R}(\{10,01\} \cup{\Omega}^\ast | {\omega})\) with \(2 \leq m_1, m_2 \leq 4\) ⋮ Balanced fractional \(2^{m_ 1}\) factorial designs of resolution V for interesting effects orthogonal to some effects concerning \(m_ 2\) factors
This page was built for publication: Balanced fractional \(r^m\times s^n\) factorial designs and their analysis
