Coins in a fountain is a problem in combinatorial mathematics that involves a generating function. The problem is described below:
In how many different number of ways can you arrange n coins with k coins at the base such that all the coins above the base layer touch exactly two coins of the lower layer.[1]
Solution:
0 | 1 | 2 | 3 | 4 | 5 | 6 | 7 | 8 | 9 | 10 | 11 | 12 | 13 |
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1 | 1 | 1 | 2 | 3 | 5 | 9 | 15 | 26 | 45 | 78 | 135 | 234 | ... |
The above sequence show the number of ways in which n coins can be stacked. So, for example for 9 coins we have 45 different ways of stacking them in a fountain. The number [math]\displaystyle{ f(n,k) }[/math] which is the solution for the above stated problem is then given by the coefficients of the polynomial of the following generating function:
[math]\displaystyle{ \begin{align} f(n,k) = \dfrac{1}{1-\dfrac{xy}{1-\dfrac{x^2y}{1-\dfrac{x^3y}{\cdots}}}} \end{align} }[/math] |
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Such generating function are extensively studied in[4]
Specifically, the number of such fountains that can be created using n coins is given by the coefficients of:
[math]\displaystyle{ \begin{align} f(n)& = & \dfrac{1}{1-\dfrac{x}{1-\dfrac{x^2}{1-\dfrac{x^3}{\cdots}}}} \, \end{align} }[/math] |
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This is easily seen by substituting the value of y to be 1. This is because, suppose the generating function for (1) is of the form:
then, if we want to get the total number of fountains we need to do summation over k. So, the number of fountains with n total coins can be given by:
which can be obtained by substituting the value of y to be 1 and observing the coefficient of xn.
Proof of generating function (1). Consider the number of ways of forming a fountain of n coins with k coins at base to be given by [math]\displaystyle{ f(n,k) }[/math]. Now, consider the number of ways of forming the same but with the restriction that the second most bottom layer (above the base layer) contains no gaps, i.e. it contains exactly k − 1 coins. Let this be called primitive fountain and denote it by [math]\displaystyle{ g(n,k) }[/math]. The two functions are related by the following equation:
[math]\displaystyle{ \begin{align} g(n,k) &= f(n-k, k-1) \, \end{align} }[/math] |
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This is because, we can view the primitive fountain as a normal fountain of n − k' coins with k − 1 coins in the base layer staked on top of a single layer of k coins without any gaps. Also, consider a normal fountain with a supposed gap in the second last layer (w.r.t. the base layer) in the r position. So, the normal fountain can be viewed as a set of two fountains:
So, we get the following relation:
[math]\displaystyle{ \begin{align} f(n,k) &= \sum_{r}g(n',r)\times f(n-n', k-r) \end{align} }[/math] |
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Now, we can easily observe the generating function relation for (4) to be:
[math]\displaystyle{ F(x,y) = 1 + F(x,y).G(x,y) }[/math] |
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and for (3) to be:
[math]\displaystyle{ G(x,y) = xyF(x,xy) }[/math] |
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Substituting (6) in (5) and re-arranging, we get the relation:
Original source: https://en.wikipedia.org/wiki/Coins in a fountain.
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