How does he do it? Despite having massive upheaval in his life, my friend and
co-conspirator Mike Desilets manages to produce not just a bit of fluff (usually
how I would describe my drivel) but a major puzzling exposition. A deep analysis
of a subject that completely confounds my powers of understanding and at the end
leaves me with a much deeper knowledge of a subject that everyone is aware of
but very few get to properly understand. I have had a tough week at work and
have only just managed to solve a couple of puzzles yesterday. This guest post
gives me a bit of a breather in my publishing schedule - thank you my friend.
Over to Mike...
Aloha kākou puzzlers,
Following fast on the heels of the previous Foreign Office post, and
at the sufferance of my editor and patron, I present today
YET MORE peg solitaire (Ed - hooray! I need to learn more). I
only hope that George B., John B., and Kevin find this interesting. If
anyone else does, that’s a bonus.
As you recall, we left off looking at an unproduced variation on William
Breitenbach’s Great 13 puzzle design. We saw that, with only slight
modification, the Great 13 can be infinitely expanded, and in either
‘direction’ to boot. Having discovered this, Mr Breitenbach took the time,
effort, and expense to acquire a design patent for what I have designated
the Great 17 solitaire puzzle.
But that is not the end of this story. As observed in the
last post, you cannot realistically expand the Great 13 puzzle much over 17 places
for practical reasons of size. It is also far from certain that
progressively increasing the number of places in a solitaire puzzle enhances
the puzzling experience. Quite the opposite, at least in my experience. But
it is possible to modify a solitaire design in another way, and that is to
tinker with the rules for allowable jumps. As you shall soon learn, this is
precisely what Mr Breitenbach did.
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Patent illustration for Great 17 variant.
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Breitenbach’s exploration of the hidden potentialities of the Great 17
resulted in a very interesting variant, for which he applied and was granted
a U.S. Patent on April 25, 1899 (downloadable from
here). We will call this Great 17 variant 17v. For temporal context, Kevin,
this patent was awarded one month after the Great 17 design patent was
issued, and a full three months
BEFORE the patent of the now-classic
Great 13. It is also worth noting that the 17v patent was issued as a
utility patent, whereas the Great 13 and 17 patents were design patents (you
can tell this from the patent numbers, which are different sequences).
Utility patents are specifically awarded for the mechanics of an invention,
how it functions, whereas design patents are intended to protect the form or
appearance of an invention. I don’t know exactly what to make of
Breitenbach’s patent choice, but I have the nagging feeling it is
meaningful.
Considering the distinctive parallelogram shape of 17v, it seems clear that
more than a little thought went into the design. Stretching and squashing
the puzzle, although not directly affecting play, was clearly intentional.
Maybe this produces a little visual confusion. If nothing else, it certainly
distinguishes the puzzle from G13 and G17. This may actually have been
critical to getting the patent application past the patent
inspectors/researchers. Possibly the utility patent choice also came down to
this as well. Two design patents for VERY similar designs (not to mention
G13) may have been a hard sell. I don’t know if the utility side of the U.S.
Patent shop researched design patents when checking for originality.
Can you spot the difference between 17v and the original Great 17?
Appearance considerations aside, let's take a look at what Mr B came up
with. It’s pretty straightforward actually. Taking the basic Great 17
structure, four of the diagonal movement options are removed. You can also
conceptualize this as the complete removal of the center rectangle, which it
is. We are left, then, with two concentric rectangles connected to the
center position by eight radial lines. As George Bell rightly observes (and
he of all people would), the result is a clock solitaire-like structure. If
you don’t know what I mean by clock solitaire, first of all, shame on you,
and second, please go to George’s solitaire
website
immediately and educate yourself. George’s article on clock solitaire is
provided
here, to save you a few clicks. I also highly recommend you purchase the only
commercially available instantiation of clock solitaire from the very good
folks over at
Creative Crafthouse. (
Ed - I have it and it is a fabulous version)
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Made for George and now available to buy with quite a few challenges
in the booklet
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Once you have done all this, you will understand why 17v is clock-like. The
fatal flaw, however, is that 17v is rectangular, not round, on the outside.
Hence, you cannot communicate all the pieces continuously around the dial,
only the corner pieces. From a clock’s perspective, this is intolerable. But
it is possible to “clockify” 17v (see below). Rounding the outer race gives
us a proper clock shape with 8 outer positions and 8 inner (as opposed to 12
outer and 6 inner for standard clock solitaire). Play around with these, if
you will, and note any interesting properties in the comments section.
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Some Breiten-clocks.
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Setko-style Breitenbach 17v.
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As you know by now, when I find an obscure historical puzzle, I am compelled
to make a version. Predictably, I modeled it on the standard Setko 5.5 x 5.5
inch board in American black walnut. Note the Eye of Sauron, which is a
little menacing and probably not the best choice (
Ed - the whole thing is stunning!). I also could not think of a good way to inscribe ‘guidelines’ to show
the allowable moves. Thus it’s somewhat abstract and probably not suitable
for general consumption; but hardly a problem for the seasoned solitairian,
of course. I did make the effort to retain the precise proportions and
angles of the patent illustration, so on that count at least, it is a
faithful instance. It may well be the only instance, in existence.
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Pretty grain and perfect pegs.
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George Bell and John Beasley have given this little puzzle some thought, and
also some computational treatment for good measure. From George’s work, we
now know a few things about the 17 variant (Thanks George! Let me know if I
don’t get this right). In addition to the standard center compliment
problem, other compliments are also solvable. It is important to first
observe, however, that the puzzle has only five unique positions (1, 2, 4,
5, 9 can represent them). Of these, compliments for positions 1, 2, 5, and 9
are solvable. Position 4, somewhat inexplicably, cannot be solved for
compliment. If you remove the position 4 peg, you can only end at positions
1 or 17. Beyond compliment problems, there is a broad range of ending
position solutions for starting positions 2 and 5. From either of these, you
may end at 7, 8, 10, 11, 13, or 16.
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Place numbering schema for George Bell’s analysis
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The larger point, Kevin, is that there is always more to a solitaire puzzle
than the conventional center compliment (as we already saw with the Great 13
in Act I). One of the most enjoyable and original challenges, for me at
least, comes from the good Doctor John Beasley. John proposes removing the
center peg and ending with only the four corners in place. The corners can
(and must) move, some of them at least, but they must end back at the
corners. This is a very clever challenge the discovering the unique dynamics
involved is hugely satisfying. It is comparable to learning an entirely new
board. (
Ed - for some reason, when I thought about that challenge my whole body
went cold and I shuddered! It sounds impossible!)
I’m sure there are many solutions to the central vacancy/four corner
problem, so it won’t be a great spoiler to present one of them here. I show
this one because I really like it, and I really like it because it
demonstrates the beauty possible in a solitaire solution. That’s important,
because when you find a beautiful solution, you tend to remember it. And if
you remember in a manner that doesn’t involve rote memorisation, one could
even say you ‘understand’ the solution (Ed - hahaha! Me? Understand one of these? NEVER!). Consistent with the highest PuzzleMad standard, you have solved the
puzzle.
It takes a little work to follow the solution movements in the illustration
above. Sorry, that just the nature of trying to show the solution in a
reasonably compressed manner. You can actually just look at the final
movement sequence and its beautiful symmetry, that’s all you need to
understand its attraction. And thanks to the mysterious properties of the
Breitenbach Singularity, the final two movements can even be made
simultaneously! (Ed - I noticed that and find it somewhat unbelievable. Quite
beautiful!)
Since you all seem to enjoy cryptic solitaire movement diagrams as much
as I do, I’ll treat you to a couple more. These are intended to beat to
death the point made above and also way back in Act I, to wit, solutions
to peg solitaire puzzles are ideally more than arbitrary movement
sequences. For Breitenbach’s Great 17 variant, I happen to have found a
couple interesting solutions. Check out the image below. This is a
pleasing clock-work solution. The beauty of a solution like this one is
that once you discover the basic concept, you will always and forever know
how to solve the puzzle. An arbitrary, unstructured solution, by contrast,
will generally need to be memorized, which I suppose counts for something.
But under the Puzzlemad solving hierarchy, it is unquestionably a lesser
form. A memorized solution, like a random string of numbers, is unlikely
to stick in your long-term memory. A concept-based solution, like the
password you use on all your accounts (with minor variations), generally
will.
My favourite and most memorable center compliment solution is not
clock-style, however, with all due respect to George and John. There is
actually a solution so simple in concept that I guarantee, once learned, it
will stick. It is relentless and rather gruesome actually. It is based on
the fact that pegs on a radial line, any radial line, can be formed into a
type of buzz-saw. It takes just two moves to set up (if using the vertical
and horizontal lines in the diagram, the moves are actually mandatory).
After this, simply transport all the outer pegs to the center position,
one-by-one, and dispose of using the reciprocating peg. Be sure that the
final pair is adjacent to your set pegs, and then perform a clever little
clean-up operation. This works with the original Great 17 as well, of
course, but I didn’t seem to see it on that board. The diagonals beg your
attention on the Great 17, but without them the radial structure dominates
and I think facilitated discovery of the cross-cutting solution.
I’m sure there are many other interesting concept-based solutions for you to
find. I wanted to share these two mainly to illustrate and drive home the
point that peg solitaire can and should be far more than a series of trial
and error attempts ending in an arbitrary solution. The sophisticated
puzzler should aim higher, and solitaire boards will reward those who do. I
suspect most casual puzzlers don’t know this about solitaire. I didn’t until
I finally started to THINK©.
This wraps up the trio of Breitenbach solitaire puzzles, one of which is
well known and has echoed forth to the present day. The other two were
apparently never produced for one reason or another. Circling all the way
back to my original declaration, I think the Great 13 was the right choice
to produce, and indeed its seems to have hit the sweet spot for both the
turn-of-the-century and the modern puzzle consumer. Once the Great 13 was on
the market, there was likely no need for a slightly larger and very similar
looking Great 17, nor indeed its bastard variant, 17v. For the 21st Century
metagrobologist, however, they sure are fun to toy around with. (Ed - I'm not so sure - my brain hurts now. It is probably better with a physical puzzle in your hands.)
I suppose that is QUITE enough peg solitaire for one day. After suffering
through this article, you are probably all desperate to get back to Kevin’s
beautiful puzzle porn. Me too. But please stay tuned for Act III, which will
be delivered to PuzzleMad HQ whenever I get around to it. No
headache-inducing diagrams next time, I promise. Now, as always, a closing
word from the most tolerant and beneficent editor you will ever have the
pleasure to write for...
Beneficent? Wow! I have never been described as that even by the present Mrs S! Thank you so much Mike! What an exposition! I am truly amazed at your skill and knowledge. You certainly made me Think and even made me go back to George's peg solitaire board and play - yes, I failed to solve almost all the challenges yet again. I love the idea of these and love that they can be properly analysed but I wish I had the ability to look at a board and see an approach/solution.
Mike is right that next week will be back to the usual semi-incoherent rubbish that I usually post on the internet! I have been trying to acquire and solve some new interesting stuff for you.
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