Anjali_Sharma Jan 8, 2017 \displaystyle{r}^{{4}} .Its the only answer.

Your proof is "okay," certainly, but you haven't covered all your bases. In particular, you leave out every case in which at least one of m,n is equal to 0. As pointed out in the comments above, ...

You have a point here: absolutely we want to count (0) as a prime ideal in \mathbb{Z} -- because \mathbb{Z} is an integral domain -- whereas we do not want to count (1) as being a prime ...

You're correct that you can't do that. In the induction step, what you know is m\cdot p = n\cdot p\Rightarrow m=n And what you're trying to prove is m\cdot (p+1) = n\cdot (p+1)\Rightarrow m=n ...

\def\N{\mathbb{N}}For w ∈ \N^* we define B_w := \{f ∈ \N^\N: w \sqsubseteq f\}. Let f ∈ \N^\N, let ∏_{i ∈ \N} U_i be a basic neighborhood of f, let n ∈ \N be such that U_i = \N for i ≥ n ...

By the Cauchy-Schwartz inequality, \big|[M(x),M(y)]_t - [M(x'),M(y)]_t - [M(x),M(y')]_t + [M(x'),M(y')]_t\big|\\ = \big|[M(x)-M(x'),M(y)-M(y')]_t\big|\le \left([M(x)-M(x')]_t[M(y)-M(y')]_t\right)^{1/2}, ...