Add to ORKG19 pages, 1 article*F-Square Geometries for n = 3, 4, 5, and 6* (Federer, W. T.; Lee, F. C.; Mandeli, J. P.) 19 page
20 pages, 1 article*A Particular Set of Orthogonal Cyclic Latin Squares of Orders 21, 27, 33, 35, 39...
12 pages, 1 article*On the Construction of Orthogonal F-Squares of Order n from an Orthogonal Array ...
11 pages, 1 article*Construction of Lattice Square Designs* (Federer, Walter T.; Wright, Jill) 11 pa...
18 pages, 1 article*F-Square Geometries for s = p(m) Illustrated with s = 4, 8, and 9* (Federer, Wa...
23 pages, 1 article*On the Construction of Complete Sets of F-Squares of Order n=2k, n=2(s)k, p(s), ...
5 pages, 1 article*F-Squares, Repeated Measures, and Nearest Neighbor Design* (Federer, Walter T.) 5...
6 pages, 1 article*Construction of F-Squares Using Permutations with Property A* (Federer, Walter T....
12 pages, 1 article*A Decomposition of a Latin Square of Order 6 into F-Squares and Some Observation...
9 pages, 1 article*On a Complete Set of Orthogonal F-Squares of Order 8 with a Mateless Latin Square...
25 pages, 1 article*On the Construction of F-Squares and Single Degree-of-Freedom Contrasts (Prelimi...
6 pages, 1 article*Construction of Orthogonal F-Squares of Order n = qk* (Federer, W. T.) 6 page
13 pages, 1 article*Latin Squares and F Squares from Euler until Now (Seminar, SUNY Binghamton, Nove...
15 pages, 1 article*Incomplete Block and Lattice Rectangle Designs for v = 36 Using F-Square Theory*...
17 pages, 1 article*On Embedding Mateless Latin Squares of Orders 12 and 16 in a Complete Set of Ort...
7 pages, 1 article*Further Contributions to the Theory of F-Squares Design* (Hedayat, A.; Raghavarao...
20 pages, 1 article*A Particular Set of Orthogonal Cyclic Latin Squares of Orders 21, 27, 33, 35, 39...
12 pages, 1 article*On the Construction of Orthogonal F-Squares of Order n from an Orthogonal Array ...
11 pages, 1 article*Construction of Lattice Square Designs* (Federer, Walter T.; Wright, Jill) 11 pa...
18 pages, 1 article*F-Square Geometries for s = p(m) Illustrated with s = 4, 8, and 9* (Federer, Wa...
23 pages, 1 article*On the Construction of Complete Sets of F-Squares of Order n=2k, n=2(s)k, p(s), ...
5 pages, 1 article*F-Squares, Repeated Measures, and Nearest Neighbor Design* (Federer, Walter T.) 5...
6 pages, 1 article*Construction of F-Squares Using Permutations with Property A* (Federer, Walter T....
12 pages, 1 article*A Decomposition of a Latin Square of Order 6 into F-Squares and Some Observation...
9 pages, 1 article*On a Complete Set of Orthogonal F-Squares of Order 8 with a Mateless Latin Square...
25 pages, 1 article*On the Construction of F-Squares and Single Degree-of-Freedom Contrasts (Prelimi...
6 pages, 1 article*Construction of Orthogonal F-Squares of Order n = qk* (Federer, W. T.) 6 page
13 pages, 1 article*Latin Squares and F Squares from Euler until Now (Seminar, SUNY Binghamton, Nove...
15 pages, 1 article*Incomplete Block and Lattice Rectangle Designs for v = 36 Using F-Square Theory*...
17 pages, 1 article*On Embedding Mateless Latin Squares of Orders 12 and 16 in a Complete Set of Ort...
7 pages, 1 article*Further Contributions to the Theory of F-Squares Design* (Hedayat, A.; Raghavarao...
20 pages, 1 article*A Particular Set of Orthogonal Cyclic Latin Squares of Orders 21, 27, 33, 35, 39...
12 pages, 1 article*On the Construction of Orthogonal F-Squares of Order n from an Orthogonal Array ...
11 pages, 1 article*Construction of Lattice Square Designs* (Federer, Walter T.; Wright, Jill) 11 pa...