Results 261 to 270 of about 328,728 (289)

Maximal arcs and disjoint maximal arcs in projective planes of order 16

Journal of Geometry, 2000
Let \(q\) be the order of a finite projective plane \(\Pi\) and \(2\leq n\leq q.\) A maximal \(\{q(n-1)+n;n\}\)-arc is a subset of \(q(n-1)+n\) points in \(\Pi\) that meets every line in \(0\) or \(n\) points. The authors present the results of computer searches for such arcs in all the known planes of order 16 with \(n=4.\) They also classify pairs of
Hamilton, N. A., Stoichev, S., Tonchev, V.   +2 more
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Maximizing the Value of Pipeline Projects

Environmental and Pipeline Engineering 2000, 2000
This paper describes the Value Engineering (VE) process and its application to pipeline projects. Eight different projects to which VE was applied were studied. The unique characteristics of these pipeline VE studies are described, along with the benefits gained through VE.
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On the Maximality of the Projective Symplectic Group

Journal of the London Mathematical Society, 1987
Author's review: \(\text{Aut}(\text{Psp}(2n,q))\) has a faithful natural representation on \(\Omega =\Omega (n,k)\), the set of all \(k\)-dimensional totally isotropic subspaces of a \(2n\)-dimensional vector space, where \(q=p^ r\) for some prime \(p\). Let \(G\) be any subgroup of \(\text{Sym}(\Omega)\) containing \(\text{Psp}(2n,q).\) If \(k>1\) and
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Maximal Weight Divisors of Projective Reed-Muller Codes

Designs, Codes and Cryptography, 2001
zbMATH Open Web Interface contents unavailable due to conflicting licenses.
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The Maximizing Study Abroad Project

2023
R. Michael Paige, Tara A. Harvey, Kate S. McCleary   +2 more
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Minimal and maximal floats in project networks

Engineering Costs and Production Economics, 1985
In project planning the float times of the activities provide a measure of the scheduling flexibility available and thus yield information for planning, monitoring and controlling the realization of a project. Although the literature on project planning by networking techniques is very extensive, there is not very much conceding the theory of float ...
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Maximizing Project Value: A Project Manager's Guide

Project Management Journal, 2014
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MCHT: A maximal clique and hash table-based maximal prevalent co-location pattern mining algorithm

Expert Systems With Applications, 2021
Lizhen Wang
exaly  

Developing Maximal Neuromuscular Power

Sports Medicine, 2012
Prue Cormie, Michael R Mcguigan, Robert U Newton   +2 more
exaly   +2 more sources

High chronic training loads and exposure to bouts of maximal velocity running reduce injury risk in elite Gaelic football

Journal of Science and Medicine in Sport, 2017
Shane Malone, Dominic A Doran, Kieran Collins   +2 more
exaly