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Questions about the branch of algebra that deals with groups.
2
votes
non trivial involutary group isomorphism of (C*,x)
$z\mapsto \frac{1}{z}$
14
votes
Non-split extension of the rationals by the integers
Building on Ralph's answer a bit we can get uncountably many inequivalent examples as Mark Grant's comment on the original post suggested there should be.
Let $S,T$ be a partition of the primes into …
13
votes
2
answers
8k
views
AC in group isomorphism between R and R^2
Using the axiom of choice, one can show that $\mathbb{R}$ and $\mathbb{R}^2$ are isomorphic as additive groups. In particular, they are both vector spaces over $\mathbb{Q}$ and AC gives bases of thes …
10
votes
4
answers
1k
views
Groups and rings which are not sets
An algebraic structure such as a group, ring, field, etc. is usually defined to be a set with some operations satisfying certain properties. I am curious what, if anything, goes wrong when the underl …
3
votes
Accepted
Random Walks in $Z^2$/$Z^2$-intrinsic characterization of Euclidean distance
As written the statement is false for $n=3$: note that $p_3(2,2) = 0$ but $p_3(3,0) > 0$, while $|(2,2)| < |(3,0)|$. Similar counterexamples exist for all $n\geq 5$. So for larger $n$ you would at l …
7
votes
Symmetries of probability distributions
Maps such as $\eta$ and $\xi$ are called measure-preserving and are studied in ergodic theory. In particular ergodic theory views these as dynamical systems, because the maps can be iterated. One th …
9
votes
Accepted
Semiring naturally associated to any monoid?
It is at least sometimes called a "monoid semiring" by analogy with "group ring". As such it would be notated $S = \mathbb{N_0}[M]$ (or $\mathbb{N}[M]$ depending how you define things).
By the way, …