Mate Puljiz, Stjepan Šebek, Josip Žubrinić
Published 2021-07-15Version 1
In this article, we consider a combinatorial settlement model on a rectangular grid where at least one side (east, south or west) of each house must be exposed to sunlight without obstructions. We are interested in maximal configurations, where no additional houses can be added. For a fixed $m\times n$ grid we explicitly calculate the lowest number of houses, and give close to optimal bounds on the highest number of houses that a maximal configuration can have. Additionally, we provide an integer programming formulation of the problem and solve it explicitly for small values of $m$ and $n$.
Comments: 22 pages, 20 figures, 2 tables
Some formulas for numbers of line segments and lines in a rectangular grid
Selections Without Adjacency on a Rectangular Grid
Counting Divisions of a $2\times n$ Rectangular Grid
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