Let $K_1, K_2, \dots$ be a countable sequence of fields, and let $\prod_{\mathcal F} K_i$ be the ultraproduct with respect to some nonprincipal ultrafilter $\mathcal F$. Question: Can there be a field isomorphism $\prod_{\mathcal F} K_i \cong \mathbb R$? I think I gather that this can’t happen if...

I am confused about the following monoidal structure, which gives a symmetric monoidal structure on R-modules (that I think is not Cartesian), even if R is not commutative. Let $C$ be a small category. Then there is a diagonal functor $\Delta: C \rightarrow C \times C$. Let $Psh(C)= Fun(C^{op}, S...

I want to make screen transition framework. Please tell me the best way. Conditions Use tkraise() method. Fast process during screen transitions is performed in main thread. (ex. tkinter(gui), change variable) Processing that takes time during screen transitions is performed on the sub thread. (...

This is a variation on this question with amorphous cardinals replaced with dedekind finite sets. Dedekind finite sets are sets that have no countable subset, and it is well known that this is a weaker assertion than a set not having a countable chain of subsets with respect to the strict inclusi...

Question: Consider quadratic algebra with four generators $a,b,c,d,d$ and three relations $ab=ba,cd = dc, ad-da = cb - bc$ . Is it a Koszul algebra ? (i.e. Koszul complex is resolution of ground field $k$). (Checking algebra is Koszul, is something algorithmic or more kind of creative task ? ) ...

I'm having some problems solving this integral: $$ I = \mathcal{P} \int_{-\infty}^{+\infty} \frac{1-e^{2ix}}{x^2} \ dx$$ where $\mathcal{P}$ is the Cauchy principal value. The exercise suggests to use the fact that: $$I_* = \frac{1}{2} \operatorname{Re} \left[I\right]=\mathcal{P} \int_{-\infty}^{...