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             S area(c11,c10,e8,g7,k6,k9,g10,e11)"
 
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== 3rd row ladders along flanks ==
 
 
We already pointed out above that climbing along a flank is analogous to a 2nd row ladder. In fact, it is also possible to climb along a flank at a greater distance. In other words, there is an analog of a 3rd row ladder along a flank. This requires slightly more space, and if the ladder is to connect, a different kind of cap (or ladder escape) is required.
 
 
ADD EXAMPLE.
 

Revision as of 05:43, 8 March 2021

Proposed article: Flank

A flank is a sequence of friendly stones that are either adjacent or linked by bridges in a certain way, and with a certain amount of space on one side, for example like this:

78645123

Apart from ladders, flanks are one of the most common "long-distance" patterns occuring in Hex. They are useful for climbing, and they can be used to form large interior and edge templates.

What makes a flank useful is that its owner can use it for climbing. For example, consider the following situation, and assume the stones "B" and "J" are connected to opposite edges.

BJA

Then Red can climb all the way from J to the cell marked "*", by a sequence of forcing moves as follows:

18201419218101715BJ249131116137512A6

It is not actually necessary for Red to play moves 6, 12, and 16; Red could also skip these moves. However, they usually do not hurt and may be useful to Red by solidifying Red's position below the flank.

Intruding into the flank's bridges does not help the opponent. The flank still works even if all the bridges have already been filled in:

BJA

Definition

A flank can belong to Red or to Blue, and it can be oriented in any of the 6 cardinal directions of the Hex board (a cardinal direction is parallel to an edge or to the short diagonal). In addition, it can be facing up or down (the side it is facing is the side where the empty space is). For simplicity, the following definition refers to red flanks that are oriented left-to-right and facing upward.

Each flank has three distinguished points: a starting point, which we usually mark "A", an endpoint, which we usually mark "B", and a jumping-off point, which we mark "J". We can define flanks inductively as follows:

  • Base case: A single red stone, together with the indicated space, is a flank. In this case, the stone marked "B" is both the starting point and the endpoint. The jumping-off point "J" is also shown.
    F0:
    JB
  • Induction step: A flank can be extended with any of the following patterns:
    F1:
    F2:
    F3:

    Here, "−" denotes the previous endpoint, and "B" denotes the new endpoint. The orientation of these patterns matters, i.e., they cannot be rotated.

Here is an example of the flank obtained by starting with F0 and then extending with F1, F1, F3, F1, F2, F3, and F1. We always use "A" to denote the starting point and "B" to denote the endpoint of the flank:

BJA

We can also use algebraic notation to denote flanks. For example, we write F0+F1+F1+F3+F1+F2+F3+F1 for the above flank.

Capped flank

A flank is capped if it has been extended past its endpoint "B" with one of the following patterns:

C1:
B
C2:
B
C3:
B
C4:
B

Here, "B" denotes the original endpoint of the flank. Other cap patterns are also possible; the above C1–C4 are just some common examples of caps.

Here are some examples of capped flanks. In each case, the flank's starting point "A" and original endpoint "B" are shown.

F0+F1+C1:

JAB

F0+F2+C2:

JBA

F0+F2+F2+F3+F2+C1:

BJA

The point of capped flanks is that if Red plays at the jumping-off point "J" of any capped flank, Red can connect:

159115101412B18613427A3

Note that climbing along a flank is a generalization of 2nd row ladders, with the cap acting as a ladder escape. Indeed, a board edge can be regarded as a straight row of stones, and is therefore a special kind of flank only made up of F1 pieces:

JAB

Interior templates from capped flanks

There are several ways of constructing interior templates from capped flanks.

Method 1

The simplest method is to add a Red piece to the jumping-off point "J". Since this connects to the rest of the flank. Such a group can be viewed as a (potentially very large) interior template.

Many of the named interior templates are of this form. This is the case for the crescent, trapezoid (in more than one way), scooter, bicycle, as well as the long crescent and various long trapezoids.

JAB
JAB
JA
JBA
JBA
JAB
JAB
JAB

Here is a larger template constructed by the same method.

BJA

Method 2

Another way to construct interior templates from flanks is to combine a capped flank and the mirror image of a capped flank so that they overlap at the point "J", schematically like this:

JA
+
JA
=
JAxA

Here, the hex "J" remains empty. The point is that if Blue plays at "x", Red plays at "J", and vice versa.

Several of the named interior templates are of this form. This is the case for the span, the box, the shopping cart, and the long span:

JAxA
JAxA
JAxA
JAxAB

Here is a larger example:

JBBAxA

Method 3

A third way to construct interior templates from flanks is to combine a capped flank with a capped flank rotated by 180 degrees, schematically like this:

AJ
+
JA
=
AJJA

or like this:

AJ
+
JA
=
JAAJ

If Blue plays at one of the hexes marked "J", Red can play at the other to keep the group connected.

Of the named interior templates, the parallelogram and the wide parallelogram are of this form:

AJJA
JAAJ

But of course, it is again possible to constuct infinitely many examples. Here is a larger example:

AJBBJA

Edge templates from capped flanks

Not surprisingly, capped flanks (appropriately rotated and positioned) can also be used to construct edge templates. There are various schemas for doing so. We give three examples. In each schema, we show the starting point "A" and the jumping-off point "J" of the capped flank, and we indicate by "*" the direction in which the flank continues.

E1:
AJ
E2:
AJ
E3:
AJ

Here is an example using schema E3 and (an appropriately rotated and mirrored version of) the capped flank F0+F2+F1+F1+F2+C1:

BAJ

Usage example

The following example is from an actual game. Blue to move and win.

abcdefghijk1234567891011

Note that Blue's central group is already connected to the left edge by double threat at e3 and c7. But how will Blue connect to the right edge? The problem is that h7 does not normally act as a 2nd row ladder escape. Blue starts at j1, then pushes the 2nd row ladder to j5 and pivots at j7. This forces Red to respond at j6.

abcdefghijk1234567891011123456789101211

Now the killer move is c10. This caps the blue flank, and the entire shaded area becomes an edge template. Blue is now connected by double threat at i6 and b10.

abcdefghijk123456789101113