By Christopher Monckton of Brenchley
The Edo period in Japanese history ran from 1603-1867. For most of that period, 1639-1854, the nation kept itself deliberately aloof from all Western influence. Japan was closed to foreigners. Meanwhile, the aristocratic samurai class developed an intriguing and elegant method of demonstrating piety in their Shinto temples.
They would carve geometric problems, typically involving circles, on timber shingles, paint them colorfully, inscribe them in kanbun (Chinese characters with diacritical marks to distinguish the Japanese usage), and affix them to the temple walls as an inspiration to subsequent visitors.
The use of kanbun by the samurai was akin to the use of Greek by Roman orators or of Latin by the English aristocracy. The sangaku tablets, therefore, were near-exclusively of samurai origin and were comprehensible to their caste alone, and of course to the delighted deities.
Contemplating the monstrosity of the Navitus Bay wind farm proposal, I was struck by the irregularity of the suggested area for the wind farm (Fig. 1).
Figure 1. The proposed site for the Navitus wind array.
Looking at the shape of the proposed site, it is at once clear that the array is as close to the shore as the developers dare to make it, partly to reduce construction and maintenance costs and partly to minimize the formidable transmission losses in the undersea cable. But the edges of the array are defined more by sight-lines from the shore than by any other consideration.
How would a mathematician go about moving the array further out to sea and compensating for the transmission losses by minimizing the shadowing effect by which turbines take each other’s wind, regardless of the wind direction, as well as minimizing the visual impact?
The prevailing wind is south-westerly, but stretching a line of wind turbines north-west to south-east to capture it would represent an unacceptable hazard to coastal shipping.
One answer is to arrange the turbines in a circle, which provides minimal visual impact. But how to dispose the turbines within the circle to minimize wind shadowing still further?
Fig. 2 shows possible solution for 192 turbines, just two fewer than the Navitus array, and occupying approximately the same area of 68 square miles (the “8” was inadvertently omitted from my recent posting on the array – mea culpa).
Figure 2. An array of 192 wind turbines, each with a 505-ft span and separated from its neighbors by five spans, intended to minimize both visual impact and wind shadow.
Assuming that each turbine’s span is 505 feet, and that turbines must be five spans apart, the diameter of the array is approximately 9 miles 3 furlongs.
Before I reveal what all this has to do with sangaku tablets and their geometric problems based on properties of circles, this method of arranging the wind turbines can also be used to create an ingenious board – the mathematician’s version of the chessboard, if you like – where equal numbers of playing-spaces (let us call them “forts”) guard each straight row (let us call it a “street”), and an equal number of streets meet at each fort.
In the board shown in Fig. 3, there are 44 forts on 77 streets, with exactly four forts guarding each street and exactly seven streets meeting at each fort.
Figure 3. The mathematician’s chessboard
Some 30 years ago I successfully marketed a board game based on a layout similar to this one. The rules I came up with are below this posting. Gentle readers, your challenge – should you choose to accept it – is to devise as many sets of new rules as you can for this board. Then I shall relaunch the game with multiple sets of rules. One board, many games.
The criteria for your rules as follows. The game must be one of pure skill, with no element of chance. It must involve simple pieces placed on the board. The rules must be short, simple and quick to learn, yet the strategy should be complex enough to make the game both exciting for all and intellectually satisfying for good minds. Try out your rules before you send them in. If they’re any good, people will become hooked by the game. That’s how we’ll get the big sales, and you’ll get your royalties.
Now for the connection to the Japanese sangaku tablets. The extraordinary and surprising feature of the layout is that, although the forts are connected by straight streets, it is circles that determine the exact positioning of the nodes coincident with the forts. This is a startling and – as far as I know – hitherto-unsuspected property of circles. The samurai would have appreciated that.
Figure 4. The surprising relation between a network of straight lines and the intersections of a set of circles rotated at equal intervals about a common point on their circumferences.
Below, as promised, are my own rules for the game of Battle. I hope this harmless diversion involving “puzzling things in life” will have given pleasure.
Rules of engagement
The objective is to drive all opposing forces from the battlefield.
The battlefield has 44 forts guarding 77 streets. Four forts guard each street. Seven streets meet at each fort. At the outset, the city is empty of all forces.
Alliances: Blue with Green, Red with Yellow may fight as pairs of allies, or armies may fight singly.
The attack: Each army attacks in turn: Blue, Red, Green, Yellow, etc. Each army’s sortie is in two phases: first, expulsion (wherever possible), then occupation.
Suppose that it is Blue, allied with Green, whose turn is to attack.
1. Expulsion
On every street, street by street, every soldier Blue outnumbers is expelled (at the beginning of the battle, of course, there are no soldiers to expel) –
Ø 2 or 3 Blues on a single street expel 1 Red, Green or Yellow soldier on that street.
Ø 1 Blue stands off against 1 Red, Green or Yellow soldier on the same street.
Ø 2 Blues stands off against 2 Red, Green or Yellow soldiers on the same street. But …
Ø 2 Blues expel 2 soldiers of different colours (e.g. Red & Green) on the same street.
Ø If expulsion exposes soldiers of other colours on cross streets, Blue expels them too.
Ø Blue must expel even outnumbered Green allies on any street (this is friendly fire)
Ø Blue returns all expelled soldiers to their commanders for later re-use.
Some examples:
2. Occupation
When Blue has expelled all possible soldiers, a Blue soldier is stationed at any empty fort, ending the attack. Occupying a fort marks the end of Blue’s sortie.
Victory: An army whose last soldier is expelled retires defeated, though its ally, if there is one, may fight on. The army or alliance that drives all enemy soldiers out of the city wins.
Some hints on basic strategy
Strategy: You will learn the rules of engagement in five minutes. But the strategy, especially with two armies in each of two alliances, is surprisingly complex.
Know the terrain: The battlefield gives equal weight to each fort and each street.
Force deployment is critical. At the beginning, there are no soldiers to expel. Deploy soldiers so as to maximize their power to attack opposing armies, to minimize the risk that they themselves will be attacked, to avoid friendly fire against allied armies, and to command as much of the field as possible.
Attack is the best form of defense. The Rules of Engagement favor aggressive tactics and penalize defensiveness.
Superior force wins. On any street, outnumbered soldiers are expelled.
Choice of position is key. Look for – and eventually learn to create – chances to attack on two or more streets by the deployment of a single well-placed soldier.
Alliances can be made or broken. Armies can fight either as standalone units or as allied forces. With three armies in play, for instance, two armies can form a temporary alliance to target the third. This game can be particularly challenging, as the two trailing forces form temporary alliances to try to fight back against the dominant army.
Unity is strength: On any street, two soldiers of the attacking army defeat and expel two soldiers from different armies, but stand off against two soldiers of one army. This rule reflects the fact that a single, united force is often stronger than divided forces. It also makes the classic game between two Generals each commanding two allied armies a particularly fascinating challenge.
Friendly fire must be avoided if possible. Under the Rules of Engagement, the attacking army must always expel all soldiers from armies that it outnumbers on any street, even if those expelled are from an allied army.
Rout: In Battle, the disastrous knock-on effects of losing one or two vital units in the field are simulated. During an army’s sortie, if it expels a soldier from one street, opposing soldiers on other streets intersecting with the fort previously occupied by the expelled soldier may become outnumbered too. If so, they, too, are expelled before the attacking army stations its soldier at any vacant fort. Beware! A defeat can quickly become a rout.
Attrition: The army or alliance in the lead can pressure its opponents to concede victory at any time.
Blitzkrieg: The game can be played against the clock, with a time limit on each move. Or the whole game can be ended at a fixed time, when the army or alliance with the most soldiers in the field is declared victorious.
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For wind turbines I have a circular design I like better – it’s called ZERO!
Currently its probably not a war game as war involves trickery and chance and who controls the streets is as important as who controls the forts. So both streets and forts need to be occupiable so people can get blocked into forts by those who controls the streets . Also pieces should be converted to the colour of the team that captures them [like in Ukraine- people swap sides]. Every war also has chance [weather, accidents,traitors,spies, deception etc] so in a war game chance is a valid part of the equation [without the heavy rain and Napoleon being ill and not making the crucial decisions Waterloo probably would have been lost. The mud played a crucial role at agincourt.]
different units move at different speeds.
but if you want no chance then chess [what the west plays] is a game of attrition and GO [what the chinese play] is a game of capture ground. If you study the chinese economic strategy they are playing GO. Also such games are games of perfect intelligence ie you can see where the other persons ‘troops’ are all the time which is not the case in real life.
ok if we assume the above picture is just a map then if it were me if i wanted to make a war game out of that map then you go to the master of war rules Sun Tzu and his book Art of War and make the rules out of that and modify the board if needed. Sun Tzu is what they teach in military academies so anything based on him will appeal to the military mind. Actually you could have 2 versions one a war game and one dressed up as a treasure hunt or something with pretty colours for those not into war but who would still find the challenge appealing [like candy crush]
Where will the diesel generators that really produce the power be sited? Will it be on the Isle of Wight, out of sight, out of mind?
I asked this question on the first wind turbine thread but didn’t see it answered.
This part of the south coast is one of the premier yachting venues in the world. Will the turbines ‘steal’ the wind from the yachts and will the yachts be excluded from large areas of the ocean around the turbines. If so, how will that be enforced?
tonyb
The reality of armies and soldiers is that moving a large group is much more difficult than a small one (think SEALS teams) and the effectiveness of an armed group reduces as the size goes up, measured on a per-soldier basis.
Thus the equality of forces is OK, mathematically and practically, during a stand-off, but when they are unequal a simple rule of ‘double’ should apply.
The idea of guerilla warfare is that small forces can defeat a lumbering one (think Afghanistan again) if they are persistent.
Two rules come to mind. If a small force can ‘see’ a large one, the general can choose to ‘nibble’ away at it by removing his one man and one from the larger opposing force. Thus 5 in one fort exposed to 5 individuals with line-of-sight means removing all, if the singleton general wants, but not if the general with 5 in one place wants. This reflects the reality of having to occupy a territory.
Another possibility is that the number of soldiers needed to defeat a group requires double the number of defenders. In real life, to guarantee a win, it is taken that the attacking force must be 3 times the resisting force. Double would be easy to calculate. Seven can’t rout 4 and this would change the ‘routing’ opportunities which I view as a weakness in the original rules. Currently the rout is more a result of rules, not the result of what is being simulated. The ‘street rules’ can exist for one-on-one or outnumbering but only for singletons. Forts or groups can be captured with an ‘overwhelming force’ of double that number.
Hmmm. I see more than a hint of graph theory here. I’ll have to dig out my relevant texts and study them again to meet the Noble Lord’s challenge.
For those of us who don’t think in the idiotic Imperial Units (which apart from horseracing in the UK which is still in miles and furlongs, is pretty much everybody) here is that sentence again in units we can understand:
Far too complicated for the Great Unwashed. If the great Scarne could not get the public to warm to his game of genius “Teeko”……..
http://en.wikipedia.org/wiki/Teeko
John A says:
May 1, 2014 at 2:04 am
Assuming that each turbine’s span is 505 feet, and that turbines must be five spans apart, the diameter of the array is approximately 9 miles 3 furlongs
This also caught my eye? I wondered whether it had been rounded to the nearest chain, or (rod, pole or perch). And whether the area covered by the wind farm could be converted to roods? Or perhaps Christopher Monkton is an avid horse racer?
Lordy lordy…your game board design reflects elements of the ‘Flower of Life’ (http://en.wikipedia.org/wiki/Flower_of_Life). Sacred Geometry – and why not?
Without doing the math, my first thought would be to investigate a layout based on the Fibonacci series spirals. Works for sunflowers and pineapples.
Richard Barraclough
I just found myself thinking that these units mean nothing to me. Since practically all of science is conducted in SI units, perhaps Viscount Brenchley could forgive the French just this once and get with the programme.
John A
The UK is a complete mish-mash of imperial and metric units. Road distances in miles, petrol in litres, temperatures (mostly) in celsius, body-weights in stones, wind-speeds in knots or miles per hour, pressure in pascals (or hectopascals), Jeremy Clarkson on Top Gear getting excited about horse-power, and plenty of other inconsistencies.
However, my biggest surprise came when I grew grain in South Africa. In order to follow price trends at the world’s biggest grain market in Chicago, I had to convert from cents per bushel into Rands per tonne. Can you believe that a bushel of maize (corn to Americans) weighs 56 pounds, while a bushel of wheat weighs 60 pounds – and this in possibly the world’s most technologically advanced country.
Mr Savage should not underestimate those whom he calls the “great unwashed”. They bought the original Battle game in large numbers. Besides, the rules are in fact simple: the manufacturer rightly insisted on that.
Thanks but your game looks too complicated for me. I will stick with nine men’s morris. Easier on the neurons.
ferdberple says: April 30, 2014 at 6:39 pm
Figure 4 reminds me of the childhood Spirograph
Reminds me more of a chart we had here long ago of the interconnectedness of climate paper references and authors.
Isn’t that a lotus flower?
I don’t understand why Mosher hasn’t done a drive by yet ?
Following Spain’s absorption of Portugal in 1580, the Tokugawa shogunate became ever more anti-Catholic, leading to the exclusion of foreigners from Japan in 1639 by Tokugawa Iemitsu. However, Protestant Dutch ships were allowed to deal with Chinese merchants on an island off Nagasaki, since the Netherlands was at war with Spain. Under some restraints, Chinese ships were welcomed, which could also bring in European goods, but purchase & ownership of such goods were also regulated.
The shogunate had previously encouraged Jesuit missionaries in order to counter the power of Buddhist institutions.
Janice Moore says:
April 30, 2014 at 7:55 pm
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{Note to all atheists: No religion is being taught here. That I below assert my own belief backed up by a story from an ancient Hebrew historical account and also report to you that some people pray is not telling you to believe nor to do as I do. If the mere quoting of the Bible and mentioning of prayer is offensive, the cause l1es within you, not this post.}
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I don’t blame you for enunciating it.
Are you done now ?
It is really boring.
In relation to the board layout in this post the user Schofe mentioned the Flower of Life. This is relevant because while the post says:
This property may be startling, but it is not unsuspected. Plenty of people have observed it before. I made a similar graph in school during some project or another. I think there was actually a fairly simple proof for it. Maybe someone with a better affinity for geometry could shed some light on it.
Richard Barraclough says:
May 1, 2014 at 5:47 am
It all depends upon what you are used to using. I have trouble thinking in terms of price per tonne as opposed to dollars or pounds per bushel. A remarkable number of crops weigh in at 60 ppb, BTW. There are slight differences as to type & grade of wheat.
Granted, the metric system is easier to use.
F. Ross says: April 30, 2014 at 9:18 pm
… Fig. 4 bears a pleasing resemblance to the chrysanthemum, which, I believe, is the national flower of Japan.
Think cherry blossom instead. Chrysanthemum is the Emperor’s flower.
.
One reason for using bushels instead of weight for corn is that the weight varies with the grain moisture content. 15½ % moisture is the storage standard for corn,
“”””””…..Janice Moore says:
April 30, 2014 at 11:24 pm …..””””””
Janice, I think sis is doing ok, but haven’t had any contact for a couple of weeks. I sent her a laptop security cable, to chain her computer to the bed. It took fed-ex about a month, to finally deliver it from the depot across the street from her apartment, to her next door neighbor, who was the third person, I tried to get it delivered to. They found the “hospital”, but couldn’t find the patient; nor could the hospital, where she’s at. Maybe the laptop got stolen already.
son is still working on a degree, instead of supporting me.
thanx
g
Mike McMillan says:
May 1, 2014 at 3:21 pm
Correct.
http://www.wheatflourbook.org/p.aspx?tabid=59