P-adic Number has Unique P-adic Expansion Representative

Theorem
Let $p$ be a prime number.

Let $\struct {\Q_p, \norm {\,\cdot\,}_p}$ be the $p$-adic numbers.

Let $a$ be a $p$-adic number, that is left coset, in $\Q_p$.

Then $a$ has exactly one representative that is a $p$-adic expansion.

Case 1
Let $\norm a_p \le 1$.

From Equivalence Class in P-adic Integers Contains Unique P-adic Expansion, $a$ has exactly one representative that is a $p$-adic expansion of the form:
 * $\ds \sum_{n \mathop = 0}^\infty d_n p^n$

Case 2
Let $\norm a_p > 1$.

From P-adic Number times P-adic Norm is P-adic Unit,
 * $\exists m \in \Z: p^m a \in \Z_p^\times$

where $\Z_p^\times$ denotes the $p$-adic units.

By definition a $p$-adic unit is a $p$-adic integer.

From Equivalence Class in P-adic Integers Contains Unique P-adic Expansion:
 * $p^m a$ has exactly one representative that is a $p$-adic expansion of the form:
 * $\ds \sum_{n \mathop = 0}^\infty d_n p^n$

From P-adic Unit has Norm Equal to One:
 * $\norm {p^m a}_p = 1 = p^0$

From P-adic Norm of P-adic Expansion is determined by First Nonzero Coefficient:
 * $d_0 \neq 0$

Let $\sequence{x_n}$ be a representative of $a \in \Q_p$.

From Rational Numbers are Dense Subfield of P-adic Numbers:
 * the constant sequence $\tuple {p^m, p^m, p^m, \dotsc}$ represents $p^m \in \Q_p$.

By definition of the product in a quotient ring:
 * the Cauchy sequence $\sequence{p^m x_n}$ is a representative of $p^m a \in \Q_p$.

From Representatives of same P-adic Number iff Difference is Null Sequence:
 * $\sequence {p^m x_n - \ds \sum_{i \mathop = 0}^n d_i p^i}$ is a null sequence

From Multiple Rule for Cauchy Sequences in Normed Division Ring:
 * $\sequence {x_n - \ds p^{-m} \sum_{i \mathop = 0}^n d_i p^i}$ is a null sequence

From Representatives of same P-adic Number iff Difference is Null Sequence:
 * $\sequence {\ds p^{-m} \sum_{i \mathop = 0}^\infty d_i p^i}$ is a representative of $a$.

That is:
 * $\ds \sum_{i \mathop = -m}^\infty e_i p^i$ is a representative of $a$

where:
 * $\forall i \ge -m: e_i = d_{i + m}$

By definition of a $p$-adic expansion;
 * $\forall i \ge 0: 0 \le d_i < p$

Then:
 * $\forall i \ge -m: 0 \le e_i = d_{i + m} < p$

Since $d_0 \neq 0$, then $e_{-m} = d_0 \neq 0$.

By definition of a $p$-adic expansion;
 * $\ds \sum_{i \mathop = -m}^\infty e_i p^i$ is a $p$-adic expansion that represents $a$

From P-adic Expansion Representative of P-adic Number is Unique:
 * $\ds \sum_{i \mathop = -m}^\infty e_i p^i$ is the only $p$-adic expansion that represents $a$

Also see

 * P-adic Number is Limit of Unique P-adic Expansion
 * Equivalence Class in P-adic Integers Contains Unique Coherent Sequence
 * Equivalence Class in P-adic Integers Contains Unique P-adic Expansion