Difference between revisions of "Template"
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* [http://www.drking.plus.com/hexagons/hex/templates.html David King's Hex template page] | * [http://www.drking.plus.com/hexagons/hex/templates.html David King's Hex template page] | ||
− | [[category: | + | [[category: Templates]] |
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+ | [[category: Definition]] |
Revision as of 21:49, 28 December 2020
A template is a minimal pattern that guarantees some kind of connection. There are several different (and sometimes overlapping) types:
Carrier
The carrier of a template consists of all of those cells (occupied or empty) that are part of the template. Empty cells in a template's carrier are an important part of the template and must not be ignored. If any of these cells are occupied by the opponent, the template is no longer valid.
Validity
We say that a proposed template is valid if it actually guarantees the kind of connection that it is claimed to guarantee, and invalid otherwise.
Minimality
Templates are, by definition, minimal. This means that removing any of the stones or empty hexes from the template would invalidate the template. For example, the following pattern guarantees a virtual connection of the red stones to the edge. However, it is not a template, because it is not minimal.
The following pattern has a smaller carrier and guarantees the same connection. It is minimal, i.e., removing any more empty hexes or any red stone makes the pattern invalid. Since the pattern is both valid and minimal, it is a template. It is known as edge template IV-2-a.
Overlapping templates
Two templates overlap if some empty cell belongs to both of their carriers. Care must be taken with overlapping templates: although each template may be valid individually, the overlapping templates may not form a valid connection as a whole. The simplest example is the following situation, called a U-turn:
Although 1 is connected to 2 via a valid bridge template, and 2 is connected to 3 via a valid bridge template, 1 is not connected to 3, because the bridges overlap at *. In fact, if Blue plays at *, Red cannot defend both bridges in a single move.