In upcoming work of Ben-Zvi-Sakellaridis-Venkatesh, (see for instance these notes or this lecture) some important aspects of the Langlands correspondence are stated in the language of topological quantum field theory. We have a TQFT i.e. a functor $A_G$, and it takes for example, a curve $C$ over...

A Latin square of order $n$ has $n$ broken diagonals and $n$ broken antidiagonals. When $n \equiv \pm 1 \pmod 6$, we have diagonally cyclic Latin squares in which those $2n$ diagonals are transversals (i.e., every symbol occurs exactly once). For example $$ \begin{bmatrix} 4 & \color{red} 3 & 2 &...

Reference : "Field Quantization" by W.Greiner & J.Reinhardt, Edition 1996. In the above reference as concerns the Hamilton density $\:\mathcal H\:$ and the Hamiltonian $\:H\:$ of the Schrodinger field, we read : The Hamilton density is \begin{equation} \mathcal H = \pi\dfrac{\partial\psi}{\part...

In what follows, I say that a monoid $M$ is torsion-free if the $n$-th power map is injective for all $n \geq 1$. I have a proof of the following result: Claim: if $M$ is a torsion-free commutative monoid and $k$ is a field, then $k[M]$ is reduced. Without going into details, here's how my proof ...