Difference between revisions of "Second order template"

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(Converted to new hexboard diagrams. Some copy-editing.)
(Expanded second order templates.)
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A '''second order template''' is a [[template]] that guarantees a connection even if the opponent is given a free move at the beginning. Put another way, a second order template is a pattern in which an intrusion is not a [[forcing move]]. A pattern can be proved to be a second order template by showing that every possible intrusion preserves at least one [[template|first order template]].
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A '''second order template''' is a [[template]] that guarantees a connection even if the opponent starts with two moves in the template. Put another way, a second order template is a pattern in which an intrusion is not a [[forcing move]]. A pattern can be proved to be a second order template by showing that every possible intrusion preserves at least one [[template|first order template]]. To qualify as a second order template, the pattern should also be minimal.
  
 
== Examples ==
 
== Examples ==
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   visible="-a1 b1 a2"
 
   visible="-a1 b1 a2"
 
   contents="R d1 e1 S area(c1,a3,f3,f1)-c3,d2,d3 R A:b2 B:f2"
 
   contents="R d1 e1 S area(c1,a3,f3,f1)-c3,d2,d3 R A:b2 B:f2"
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  />
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=== Fourth row ===
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The following is a second order template:
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<hexboard size="4x6"
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  coords="none"
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  edges="bottom"
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  visible="-area(a1,a3,c1)"
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  contents="R d1 e1 f1"
 
   />
 
   />
  
 
== Usage ==
 
== Usage ==
  
A first order edge template proves that a group is connected, provided the player answers threats made to the connection. If the player wants to preserve the connection, the opponent can intrude into the template's [[carrier]] and play stones that will later serve as [[ladder escape]]s. Such moves belong to the category of [[double threat]]s. Recognizing second order edge templates helps to know whether an area is safe or might be subject to such double threats.
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=== In play ===
  
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It is usually not a good idea to create a second order templates on purpose, as this tends to waste a move that would be better spent elsewhere. However, it is still useful to recognize second order templates in case they form accidentally.
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When the opponent intrudes into a first order template, it is usually necessary to defend the template to preserve the connection. The opponent can take advantage of this by playing template intrusions that will later be useful to the opponent, for example as [[ladder escape]]s or to gain [[territory]]. Such moves belong to the category of [[double threat]]s.
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On the other hand, when the opponent intrudes into a second order template, no immediate response is necessary; the template's owner can simply ignore the intrusion and is free to move elsewhere, thereby gaining the [[initiative]]. Recognizing second order edge templates helps to know whether an area is safe or might be subject to threats.
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=== In mustplay analysis ===
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Second order templates can sometimes be useful in the analysis of Hex positions, such as [[mustplay region|mustplay analysis]]. For example, suppose we want to prove the correctness of the following 6th row (first order) edge template:
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<hexboard size="6x7"
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  coords="none"
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  edges="bottom"
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  visible="-area(a1,a5,e1) g1 g2"
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  contents="R f1 f3 g3 E a:e2 b:f2 c:e3"
 +
  />
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We can reason as follows: if Blue plays anywhere in the template except a, b, or c, then Red can play at c, forming the second order template
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<hexboard size="4x6"
 +
  coords="none"
 +
  edges="bottom"
 +
  visible="-area(a1,a3,c1)"
 +
  contents="R d1 e1 f1"
 +
  />
 +
Since Blue has at most one stone in this template, the result is still a first-order template, so that Red is connected to the edge. Therefore, the only intrusions we need to consider are a, b, and c. This greatly simplifies the analysis, as we must now only consider 3 possible intrusions, rather than all 22 of them. (The intrusions at a or c are easily dealt with, since Red can simply respond at b to connect via [[edge template IV2a]]. The final intrusion at b has a few further cases to consider, but is relatively straighforward).
  
 
[[category:templates]]
 
[[category:templates]]
 
[[category:connection types]]
 
[[category:connection types]]
 
[[category:advanced Strategy]]
 
[[category:advanced Strategy]]

Revision as of 01:18, 26 April 2022

A second order template is a template that guarantees a connection even if the opponent starts with two moves in the template. Put another way, a second order template is a pattern in which an intrusion is not a forcing move. A pattern can be proved to be a second order template by showing that every possible intrusion preserves at least one first order template. To qualify as a second order template, the pattern should also be minimal.

Examples

Second row

Third row

This pattern can be reduced to ziggurats:

Therefore, any potential forcing moves must lie in the overlapping area. However, the overlap is also non-forcing, thanks to Red's moves A and B.

AB

Fourth row

The following is a second order template:

Usage

In play

It is usually not a good idea to create a second order templates on purpose, as this tends to waste a move that would be better spent elsewhere. However, it is still useful to recognize second order templates in case they form accidentally.

When the opponent intrudes into a first order template, it is usually necessary to defend the template to preserve the connection. The opponent can take advantage of this by playing template intrusions that will later be useful to the opponent, for example as ladder escapes or to gain territory. Such moves belong to the category of double threats.

On the other hand, when the opponent intrudes into a second order template, no immediate response is necessary; the template's owner can simply ignore the intrusion and is free to move elsewhere, thereby gaining the initiative. Recognizing second order edge templates helps to know whether an area is safe or might be subject to threats.

In mustplay analysis

Second order templates can sometimes be useful in the analysis of Hex positions, such as mustplay analysis. For example, suppose we want to prove the correctness of the following 6th row (first order) edge template:

abc

We can reason as follows: if Blue plays anywhere in the template except a, b, or c, then Red can play at c, forming the second order template

Since Blue has at most one stone in this template, the result is still a first-order template, so that Red is connected to the edge. Therefore, the only intrusions we need to consider are a, b, and c. This greatly simplifies the analysis, as we must now only consider 3 possible intrusions, rather than all 22 of them. (The intrusions at a or c are easily dealt with, since Red can simply respond at b to connect via edge template IV2a. The final intrusion at b has a few further cases to consider, but is relatively straighforward).