@article{deadcdff7db44dea9c3d6c7a2c5350b9,
title = "On Point-Cyclic Resolutions of the 2-(63,7,15) Design Associated with PG(5,2)",
keywords = "Automorphism Group, Projective Geometry, Resolvable Design, Cyclic Automorphism, Design Associate",
author = "Sarmiento, {Jumela F}",
note = "A t(v,k,λ) design is a set of v points together with a collection of its k-subsets called blocks so that t points are contained in exactly λ blocks. PG(n,q), the n-dimensional projective geometry over GF(q) is a 2(q n +q n−1 +⋯+q+1,q 2+q+1, q n−2 + q n−3 +⋯+q+1) design when we take its points as the points of the design and its planes as the blocks of the design. Sarmiento, J. F. (2002). On Point-Cyclic Resolutions of the 2-(63,7,15) Design Associated with PG(5,2). Graphs and Combinatorics, 18(3), 621–632. https://doi.org/10.1007/s003730200046",
year = "2002",
month = oct,
doi = "10.1007/s003730200046",
language = "American English",
volume = "18",
journal = "Graphs and Combinatorics",
number = "3",
}