You've got your laws of indices all messed up my friend. a^m × a^n = a^{m+n} when bases are the same. a^m × b^m = (a×b)^m when powers are same. In your case both the base and the power is ...

There is an amazing trick called the Chinese Remainder Theorem. It lets you rewrite \mathbb{Z}_{mn} as \mathbb{Z}_m \times \mathbb{Z}_n as long as m, n are coprime. If m, n are coprime, you ...

Is this the correct procedure? Do I not need to recalculate the centre-of-mass position/velocity after each time step? I've made a big mistake somewhere; the planets are very unstable and either move ...

Your reasoning is correct. One suggestion for the notation, though: You should write (f\times g)^{-1}(\pi_1^{-1}(U)) instead of \color{red}{(f\times g)^{-1}\circ \pi_1^{-1}(U)} since you ...

Note that (x - 1)(x + 1) \equiv 0 \mod{2^k} will imply that x must be an odd integer. So we may assume that x = 2m + 1. Putting value of x in the equation we have 4m(m+1) \equiv 0 \mod{2^k} ...

I prefer to write {^JX} for the set of functions from J to X. Each f\in{^JX} is, as you say, a relation, but not from X to J: it’s a relation from J to X, so {^JX}\subseteq\wp(J\times X) ...