# Difference between revisions of "2010 USAJMO Problems/Problem 1"

## Problem

A permutation of the set of positive integers $[n] = \{1, 2, \ldots, n\}$ is a sequence $(a_1, a_2, \ldots, a_n)$ such that each element of $[n]$ appears precisely one time as a term of the sequence. For example, $(3, 5, 1, 2, 4)$ is a permutation of $[5]$. Let $P(n)$ be the number of permutations of $[n]$ for which $ka_k$ is a perfect square for all $1\leq k\leq n$. Find with proof the smallest $n$ such that $P(n)$ is a multiple of $2010$.

## Solutions

We claim that the smallest $n$ is $67^2 = \boxed{4489}$.

### Solution 1

Let $S = \{1, 4, 9, \ldots\}$ be the set of positive perfect squares. We claim that the relation $R = \{(j, k)\in [n]\times[n]\mid jk\in S\}$ is an equivalence relation on $[n]$.

• It is reflexive because $k^2\in S$ for all $k\in [n]$.
• It is symmetric because $jk\in S\implies kj = jk\in S$.
• It is transitive because if $jk\in S$ and $kl\in S$, then $jk\cdot kl = jlk^2\in S\implies jl\in S$, since $S$ is closed under multiplication and a non-square times a square is always a non-square.

We are restricted to permutations for which $ka_k \in S$, in other words to permutations that send each element of $[n]$ into its equivalence class. Suppose there are $N$ equivalence classes: $C_1, \ldots, C_N$. Let $n_i$ be the number of elements of $C_i$, then $P(n) = \prod_{i=1}^{N} n_i!$.

Now $2010 = 2\cdot 3\cdot 5\cdot 67$. In order that $2010\mid P(n)$, we must have $67\mid n_m!$ for the class $C_m$ with the most elements. This means $n_m\geq 67$, since no smaller factorial will have $67$ as a factor. This condition is sufficient, since $n_m!$ will be divisible by $30$ for $n_m\geq 5$, and even more so $n_m\geq 67$.

The smallest element $g_m$ of the equivalence class $C_m$ is square-free, since if it were divisible by the square of a prime, the quotient would be a smaller element of $C_m$. Also, each prime $p$ that divides $g_m$ divides all the other elements $k$ of $C_m$, since $p^2\mid kg_m$ and thus $p\mid k$. Therefore $g_m\mid k$ for all $k\in C_m$. The primes that are not in $g_m$ occur an even number of times in each $k\in C_m$.

Thus the equivalence class $C_m = \{g_mk^2\leq n\}$. With $g_m = 1$, we get the largest possible $n_m$. This is just the set of squares in $[n]$, of which we need at least $67$, so $n\geq 67^2$. This condition is necessary and sufficient.

### Solution 2

This proof can also be rephrased as follows, in a longer way, but with fewer highly technical words such as "equivalence relation":

It is possible to write all positive integers $n$ in the form $p\cdot m^2$, where $m^2$ is the largest perfect square dividing $n$, so $p$ is not divisible by the square of any prime. Obviously, one working permutation of $[n]$ is simply $(1, 2, \ldots, n)$; this is acceptable, as $ka_k$ is always $k^2$ in this sequence.

Lemma 1. We can permute any numbers that, when each divided by the largest perfect square that divides it, yield equal quantities $p$.

Proof. Let $p_k$ and $m_k$ be the values of $p$ and $m$, respectively, for a given $k$ as defined above, such that $p$ is not divisible by the square of any prime. We can obviously permute two numbers which have the same $p$, since if $p_j = p_w$ where $j$ and $w$ are 2 values of $k$, then $j\cdot w = p_j^2\cdot m_j^2\cdot m_w^2$, which is a perfect square. This proves that we can permute any numbers with the same value of $p$.

End Lemma

Lemma 2. We will prove the converse of Lemma 1: Let one number have a $p$ value of $\phi$ and another, $\gamma$. $\phi\cdot f$ and $\gamma\cdot g$ are both perfect squares.

Proof. $\phi\cdot f$ and $\gamma\cdot g$ are both perfect squares, so for $\phi\cdot \gamma$ to be a perfect square, if $g$ is greater than or equal to $f$, $g/f$ must be a perfect square, too. Thus $g$ is $f$ times a square, but $g$ cannot divide any squares besides $1$, so $g = 1f$; $g = f$. Similarly, if $f\geq g$, then $f = g$ for our rules to keep working.

End Lemma

We can permute $l$ numbers with the same $p$ in $l!$ ways. We must have at least 67 numbers with a certain $p$ so our product will be divisible by 67. Obviously, then it will also be divisible by 2, 3, and 5, and thus 2010, as well. Toms as $h$, in general, we need numbers all the way up to $h\cdot 67^2$, so obviously, $67^2$ is the smallest such number such that we can get a $67!$ term; here 67 $p$ terms are 1. Thus we need the integers $1, 2, \ldots, 67^2$, so $67^2$, or $\boxed{4489}$, is the answer.

## Solution Number Sense

We have to somehow calculate the number of permutations for a given $n$. How in the world do we do this? Because we want squares, why not call a number $k=m*s^2$, where $s$ is the largest square that allows $m$ to be non-square? $m=1$ is the only square $m$ can be, which only happens if $k$ is a perfect square.

For example, $126 = 14 * 3^2$, therefore in this case $k=126, m = 14, s = 3$.

I will call a permutation of the numbers $P$, while the original $1, 2, 3, 4, ...$ I will call $S$.

Note that essentially we are looking at "pairing up" elements between $P$ and $S$ such that the product of $P_k$ and $S_k$ is a perfect square. How do we do this? Using the representation above.

Each square has to have an even exponent of every prime represented in its prime factorization. Therefore, we can just take all exponents of the primes $mod 2$ and if there are any odd numbers, those are the ones we have to match- in effect, they are the $m$ numbers mentioned at the beginning.

By listing the $m$ values, in my search for "dumb" or "obvious" ideas I am pretty confident that only values with identical $m$s can be matched together. With such a solid idea let me prove it.

If we were to "pair up" numbers with different $m$s, take for example $S_{18}$ with an $m$ of $2$ and $P_{18}=26$ with an $m$ of $26$, note that their product gives a supposed $m$ of $13$ because the $2$ values cancel out. But then, what happens to the extra $13$ left? It doesn't make a square, contradiction. To finish up this easy proof, note that if a "pair" has different $m$ values, and the smaller one is $m_1$, in order for the product to leave a square, the larger $m$ value has to have not just $m_1$ but another square inside it, which is absurd because we stipulated at the beginning that $m$ was square-free except for the trivial multiplication identity, 1.

Now, how many ways are there to do this? If there are $c_1$ numbers with $m=1$, there are clearly $(c_1)!$ ways of sorting them. The same goes for $m=2, 3, etc.$ by this logic. Note that the $P(n)$ as stated by the problem requires a $67$ thrown in there because $2010=2*3*5*67$, so there has to be a $S_n$ with 67 elements with the same $m$. It is evident that the smallest $n$ will occur when $m=1$, because if $m$ is bigger we would have to expand $n$ to get the same number of $m$ values. Finally, realize that the only numbers with $m=1$ are square numbers! So our smallest $n=67^2=4489$, and we are done.

I relied on looking for patterns a lot in this problem. When faced with combo/number theory, it is always good to draw a sketch. Never be scared to try a problem on the USAJMO. It takes about 45 minutes. Well, it's 2010 and a number 1. Cheers!

-expiLnCalc

## Solution Easy

Consider the set of numbers $m*k^2$ such that $m$ is not divisible by any squares other than 1 and $k = 1, 2, ...$ By changing $m$ we can encompass all numbers less than or equal to $n$. Now notice that for a working arrangement these numbers can be permutated in any way to create a new one; for instance, the numbers $2,8,18$ have $m = 2$ and they can be arranged in $3! = 6$ ways. Thus, since $2010 = 2*3*5*67$ we need a permutation to have at least 67 elements (since 67 is prime). To minimize $n$, we let $m = 1$ and we have $1^2,2^2,3^2,...67^2$ and we stop at $67^2$ to get $\boxed{4489}$. ~Leonard_my_dude~

## Solution 5

It's well known that there exists $f(n)$ and $g(n)$ s.t. $n = f(n) \cdot g(n)$, s.t. no square divides $f(n)$ other than 1, and $g(n)$ is a perfect square.

Lemma: $k \cdot a_k$ is a perfect square if and only if $f(k) = f(a_k)$ We prove the backwards direction first. If $f(k) = f(a_k)$, $k \cdot a_k = f(k) \cdot g(k) \cdot f(a_k) \cdot g(a_k) = f(k)^2 \cdot g(k) \cdot g(a_k)$, which is a perfect square.

We will now prove the forwards direction. We will prove the contrapositive: If $f(k) \neq f(a_k)$, $k \cdot a_k$ is not a perfect square. Note that if $f(k) \neq f(a_k)$, There exists a prime p, s.t. $v_p(k) \neq v_p(a_k)$. Also, $v_p(k), v_p(a_k) \leq 1$. Thus, $v_p(k \cdot a_k) = 1$, making $k \cdot a_k$ not a square.

Thus, we can only match k with a_k if they have the same f value. Thus, to find P(k), we can do it by f value, permuting the a_k with f value 1, then 2, ... Thus, our answer is:

$P(n) = \prod_{1 \leq i \leq n, g(i) = 1} \left\lfloor \sqrt{\frac{n}{i}} \right \rfloor !$

For all $n < 67^2$, $P(n)$ doesn't have a factor of 67. However, if $n = 67^2$, the first term will be a multiple of 2010, and thus the answer is $67^2 = \boxed{4489}$