- The crossing number of a graph in the plane Wynand Winterbach
- Two Combinatorial Problems involving Lottery Schemes
- Die Suid-Afrikaanse uitgebreide maritieme gebied: 'n Alternatiewe metode vir die bepaling van
- Bounds for Ramsey numbers in multipartite Eugene Heinz Stipp
- Discrete Mathematics 307 (2007) 28532860 www.elsevier.com/locate/disc
- Volume 21 (1), pp. 3351 http://www.orssa.org.za
- Diagonal Ramsey Numbers in Multipartite Graphs
- Higher Order Domination Stephen Benecke
- Protection of Complete Multipartite Graphs S Benecke, PJP Grobler & JH van Vuuren
- Infinite Order Domination in Graphs AP Burger + , EJ Cockayne + , WR Grundlingh # ,
- Network Reliability as a result of Redundant Connectivity
- Protection of Complete Multipartite Graphs S Benecke, PJP Grobler & JH van Vuuren
- Volume 22 (1), pp. 3557 http://www.orssa.org.za
- MODELLING THE EFFECT OF HUMANCAUSED MORTALITY ON A LION SUBPOPULATION USING SPREADSHEETS
- ORiON, Vol. 17, No. 1/2, pp. 13-28 ISSN 0259-191-X QUANTIFYING THE ROLE OF PERSONAL
- A comparison between continuous and discrete modelling of cables with bending stiness
- Vertex Covers and Secure Domination in Graphs Alewyn P. Burger, 2
- The Lottery Problem Alewyn P Burger + , Werner R Grundlingh # & Jan H van Vuuren #
- Detecting Fraud in Cellular Telephone Networks
- Two New Combinatorial Problems involving Dominating Sets for Lottery Schemes
- On the Maximum Degree Chromatic Number of a Graph
- Infinite Order Domination in Graphs , EJ Cockayne
- J Sched (2007) 10: 387405 DOI 10.1007/s10951-007-0035-7
- Modelling torsion in an elastic cable in space Stephen Benecke, Jan H. van Vuuren *
- Volume 23 (1), pp. 2949 http://www.orssa.org.za
- Enumerating Optimal Solutions to Special Instances of the Lottery Problem
- Lions in the Kgalagadi Transfrontier Park: modelling the effect of human-caused mortality
- On an Open Problem in Defective Graph Colourings
- Two Combinatorial Problems involving Lottery Schemes
- Towards a Characterisation of Lottery Set Overlapping Structures
- Two New Combinatorial Problems involving Dominating Sets for Lottery Schemes
- Modelling the South African fresh fruit export supply chain
- Optimal Inventory Control in Cardboard Box Producing Factories
- Protection of a Graph EJ Cockayne y , PJP Grobler z , WR Grundlingh z ,
- Finite Order Domination in Graphs AP Burger + , EJ Cockayne + , WR Grundlingh # ,
- Optimal Inventory Control in Cardboard Box Producing Factories
- Two Combinatorial Problems involving Lottery Schemes: Characterising
- 3D Numerical Techniques for Determining the Foot of a Continental Slope
- On the placement of a number of strings in a collection of hats
- Modelling the South African fresh fruit export supply chain
- An Algorithmic Approach to the 2D Oriented Strip Packing Problem
- Bounds for Ramsey numbers in multipartite Eugene Heinz Stipp
- A survey and comparison of heuristics for the 2D oriented on-line strip packing problem
- On the Optimality of Belic's Lottery Designs , WR Grundlingh
- The Depression of a Graph EJ Cockayne , G Geldenhuys y , PJP Grobler y ,
- Network service scheduling and routing , J. le Rouxb
- Higher Order Domination Stephen Benecke
- The Lottery Problem Alewyn P Burger
- Two Combinatorial Problems involving Lottery Schemes: Characterising
- Finite Order Domination in Graphs , EJ Cockayne
- South Africa for publication in
- On a Routing and Scheduling Problem Concerning Multiple Edge Traversals in Graphs
- Diagonal Ramsey Numbers in Multipartite Graphs
- On the Optimality of Belic's Lottery Designs AP Burger y , WR Grundlingh & JH van Vuuren
- Network Reliability as a result of Redundant Connectivity
- MODELLING THE EFFECT OF HUMAN-CAUSED MORTALITY ON A LION SUB-POPULATION USING SPREADSHEETS
- On the placement of a number of strings in a collection of hats
- On the Maximum Degree Chromatic Number of a Graph
- A mathematical approach to nancial allocation strategies
- 3D Numerical Techniques for Determining the Foot of a Continental Slope
- A survey and comparison of level heuristics for the 2D oriented strip packing problem
- On the lower r, s domination parameter of a graph
- Instance Order Size jSj L(G) R(S) W(S; ; ) Time TREE-S1 26 25 36 106 976 30 162 61 201 0.099 66
- Enumerating Optimal Solutions to Special Instances of the Lottery Problem
- Two Combinatorial Problems Concerning Lotteries AP Burger y , WR Grundlingh & JH van Vuuren
