Null Sequences form Maximal Left and Right Ideal/Lemma 8

Theorem
Let $\struct {R, \norm {\, \cdot \,} }$ be a normed division ring.

Let $\CC$ be the ring of Cauchy sequences over $R$

Let $\NN$ be the set of null sequences.

Then:
 * There is no left ideal $\JJ$ of $\CC$ such that $\NN \subsetneq \JJ \subsetneq \CC$

Proof
Let $\JJ$ be a left ideal of $\CC$ such that $\NN \subsetneq \JJ \subseteq \\CC$.

It will be shown that $\JJ$ = $\CC$, from which the result will follow.

Let $\sequence {x_n} \in \JJ \setminus \NN$

By Inverse Rule for Cauchy sequences then
 * $\exists K \in \N: \sequence { \paren {x_{K + n} }^{-1} }_{n \mathop \in \N}$ is a Cauchy sequence.

Let $\sequence {y_n}$ be the sequence defined by:
 * $y_n = \begin {cases} 0 & : n \le K \\ \paren {x_n}^{-1} & : n > K \end {cases}$

By Cauchy Sequence with Finite Elements Prepended is Cauchy Sequence then $\sequence {y_n} \in \CC$

By the definition of a left ideal the product $\sequence {y_n} \sequence {x_n} = \sequence {y_n x_n} \in \JJ$

By the definition of $\sequence {y_n}$ then:
 * $y_n x_n = \begin {cases} 0 & : n \le K \\ 1 & : n > K \end {cases}$

Let $\mathcal {1} = \tuple {1, 1, 1, \dotsc}$ be the unity of $\CC$

Then $\mathcal {1} - \sequence {y_n} \sequence {x_n}$ is the sequence $\sequence {w_n}$ defined by
 * $w_n = \begin{cases} 1 & : n \le K \\ 0 & : n > K \end {cases}$

By Convergent Sequence with Finite Elements Prepended is Convergent Sequence then $\sequence {w_n}$ is convergent to 0.

So $\sequence {w_n} \in \NN \subsetneq \JJ$

Since $\sequence {y_n} \sequence {x_n}, \sequence {w_n} \in \JJ$ by the definition of a ring ideal then:
 * $\sequence {w_n} + \sequence {y_n} \sequence {x_n} = \mathcal {1} \in \JJ$

By the definition of a left ideal then:
 * $\forall \sequence {a_n} \in \CC, \sequence {a_n} \circ \mathcal {1} = \sequence {a_n} \in \JJ$

Hence $\JJ = \CC$