Basis Representation Theorem

Theorem
Let $b \in \Z: b > 1$.

For every $n \in \Z_+$, there exists one and only one sequence $\left \langle {r_k} \right \rangle_{0 \le k \le m}$ such that:


 * 1) $\displaystyle n = \sum_{j = 0}^k r_j b^j$;
 * 2) $\displaystyle \forall j \in \left[{0 \, . \, . \, k}\right]: r_j \in \N_b$;
 * 3) $r_k \ne 0$.

This unique sequence is called the representation of $n$ to the base $b$, or, informally, we can say $n$ is (written) in base $b$.

Proof
Let $s_b \left({n}\right)$ be the number of ways of representing $n$ to the base $b$.

We need to show that $s_b \left({n}\right) = 1$ always.

Now, it is possible that some of the $r_i = 0$ in a particular representation. So we may exclude these terms, and it won't affect the representation.

So, suppose:


 * $n = r_k b^k + r_{k-1} b^{k-1} + \cdots + r_t b^t$

where $r_k \ne 0, r_t \ne 0$.

Then:

from the identity $\displaystyle \sum_{j = 0}^{n - 1} x^j = {\frac {x^n - 1} {x - 1}}, x \ne 1$.

Note that we have already specified that $b > 1$.

So for each representation of $n$ to the base $b$, we can find a representation of $n-1$.

If $n$ has another representation to the base $b$, then the same procedure will generate a new representation of $n - 1$. Thus $s_b \left({n}\right) \le s_b \left({n - 1}\right)$.

Note that this holds even if $n$ has no representation at all, because if this is the case, then $s_b \left({n}\right) = 0 \le s_b \left({n - 1}\right)$.

So this inequality implies the following:


 * $\displaystyle \forall m, n: s_b \left({m}\right) \le s_b \left({m - 1}\right) \le \ldots \le s_b \left({n + 1}\right) \le s_b \left({n}\right)$

From N less than M to the N‎ and the fact that $b^n$ has at least one representation (itself), we see:


 * $1 \le s_b \left({b^n}\right) \le s_b \left({n}\right) \le s_b \left({1}\right) = 1$

The entries at either end of this inequality are $1$, so all the intermediate entries must also be $1$.

So $s_b \left({n}\right) = 1$ and the theorem has been proved.

Comment
So, once we have chosen a base $b > 1$, we can express any positive integer $n$ uniquely as:


 * $\displaystyle n = \sum_{j = 0}^k {r_j b^j}: r_0, r_1, \ldots, r_k \in \left\{{0, 1, \ldots, b-1}\right\}$

Then we can write $\displaystyle n = \sum_{j = 0}^m {r_j b^j}$ as:


 * $\displaystyle \left[{r_m r_{m-1} \ldots r_2 r_1 r_0}\right]_b$

Also see

 * Number base