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Consider jigsaw puzzle P. If its pieces are identically-shaped, is the difficulty of the puzzle greater or smaller than with a puzzle where pieces can only be fit into some of the others?

Claim. Differently-shaped pieces make a puzzle easier to solve.










Proof.

Consider a box P, where every piece pi has an exact match with either two (for corner pieces), three (edge pieces), or four (internal pieces) other pieces Pmatch,i = {pm} (so 2 ≤ |Pmatch,i| ≤ 4). Consider also those pieces Pimp,i = {pj}, for which an imperfect match exists with pi. There is a tolerance ti ∈ T associated with each pi, where ti > z for some lower bound z. This tolerance expresses the probability of a piece matching any other piece, and is a function of the shape of its teeth and concavities.

The tolerance for any pi in a puzzle with identically-shaped pieces is the limit as ti → 1, since any piece can fit into any other piece. The size of the set of pieces with which pi fits (|Pfit,i| = |Pmatch,i| + |Pimp,i|) is directly proportional to the tolerance for that piece, or |Pfit,i| = x|1 - ti|, for some x ∈ ℜ: the lower the tolerance, the less likely pi is to fit with any pj, and thus there are fewer pieces with which it can have an imperfect fit. Note that Pimp,i varies with ti, but Pmatch,i does not. Thus, as ti → 0, |Pimp,i| → 0. If |Pimp,i| = 0, then the only pm which fit pi are the 2-4 pieces which are the correct neighbors.

Thus, the more similarly-shaped the pieces of a puzzle are, the more possible matches there are for any given piece, and the harder it is to find its correct neighboring pieces. QED.


Now, you may have noticed that this is not the most elegant proof out there. So I challenge you to write me a proof worth of the Book.

1/15/08: We have a winner! DTal, as you can see, has responded. Of course, there's still space for a runner-up if you can write a better mathematical proof than mine.

This completely ignores the human element, in both the act of creating and the act of solving a puzzle. There are two distinct methods of finding the correct piece: shape, and colour. A puzzle with regular pieces forces a potential solver to rely on colour and image characteristics such as lines, but is also utterly predictable. An irregularly carved puzzle need not, but it does have the potential for deliberate trickery.

Let me tell you about my dear grandmother. She's a puzzle-maker by trade, and she wields a mean jigsaw. She invariably sends us at least one of her puzzles for Christmas. Fiendishly difficult, they are quite idiosyncratic with distinctively loopy pieces and full of cunning traps. Because each piece is hand-cut on a jigsaw, no two are alike. Oftentimes, she'll carve a piece along a line of colour to make the neighboring one hard to find. I have also done puzzles of hers which seemed to have 5 corner pieces (one was a dummy), 3 corner pieces (one was disguised), and NO corner pieces (the puzzle, it transpired, was round). Algorithm THAT, Major!

Another thing to consider is that while the pieces themselves are not identical in an irregular puzzle, the elements that make up a piece (loops, curves, hooks, etc.) can still be quite quite common. Since the human eye is bad at gauging exact tolerances, the number of potential "fits" is astronomical. Furthermore, a non-regular piece gives no clue as to its correct orientation, so it may potentially fit in a much larger number of places. Putting constraints on the way a puzzle is made, as is is done with a regular puzzle, cannot possibly INCREASE its potential complexity, can it?

Really, having done both regular and irregular puzzles, I can personally testify that irregular puzzles are both considerably harder and much more engaging (though you are of course free to disagree). Irregular puzzles are a challenge, a gauntlet cast by the puzzle maker. If you've never done an irregular puzzle, I know a very good vendor in the New England area...


Also, do I see the word "pimp" in your writeup? Why yes, I think I do. Five times, no less.
The most difficult puzzle I can conceive would by happenstance use pieces of exactly the same shape and size. To be particular, the puzzle would be a large hexagonalshape with at a minimum a thousand pieces, each of which would be hexagonal as well. Because the outer lines of the larger encompassing hexagon would be made of those smaller hexagonal components, the puzzle simply would not have any 'straight' edges at all. It's edge would simply be the jagged pattern of an outer row of hexagons.

The subject of the puzzle would be the color gray. Essentially, then, it would be a light gray tone, fading slightly off-center toward a barely lighter shade of that same gray amorphously floating inside it, with a subtle but constant fade from edge toward center. By my reckoning, it would be possible to make such a puzzle with precisely one correct solution, and possible again (though perhaps requiring some advanced technological aid) to determine whether the puzzle was indeed put together correctly or incorrectly. But it would likely drive a man mad to try to get all those very similarly shaded hexagons not only in the right place but each in the correct orientation.

Confessedly, on the other hand, if the sole judge of the correct completeness of the puzzle is the human eye, and not a mechanized certifier, the pieces fitting so easily together might prompt the puzzle solver to simply put together the hard-to-distinguish pieces in a 'good enough' approximation of the intended final outcome, at which point they will humanly declare victory and pat themselves on the back. Perhaps, then, an even more devious effort would be to make a puzzle composed of nothing more than extremely narrow concentric circles of a dozen or more bands of iridescent and shifting rainbow colors laid out in no particular order. Now that I've thought about it, I am going to create just such a puzzle and gift it to somebody I wish to give the gift of madness.

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