Let $\epsilon_1,\ldots,\epsilon_n$ be a sequence of signs and $M(t)$ be the tridiagonal matrix whose diagonal entries are $\epsilon_1 t,\ldots, \epsilon_n t$ and off-diagonal entries equal to $1$. Is it true that the number of real zeroes of $P(t)=\det M(t)$ is equal to the absolute value of $\ep...

(My apologies if this is well-known: I feel that I'm missing something very obvious here.) Basic question: Do filtered colimits exist in the effective topos? The reason I feel I'm missing something very obvious is that Jaap van Oosten wrote en entire paper titled “Filtered colimits in the effecti...

Suppose that $G=(G_{ij})$ is a positive-semidefinite symmetric matrix with the diagonal entries all equal $1$ and all off-diagonal entries $\le0$. Does it then necessarily follow that $$\sum_{i,j}(G^5)_{ij}\le\sum_{i,j}(G^3)_{ij}\,?$$ This is true if it is additionally assumed that all off-diagon...

I have this JSON data: { "next": null, "previous": null, "results": [ { "order_id": 6853556, "original_transaction_date": "2023-02-11T01:50:32.702336+08:00", "order_lines": [], "shipping_address": {}, "is_editable": false, "status": "fulfilled", ...

Lets take the intersection of the theory of $L_{\omega_1^{CK}}$ and $\sf ZF + [V=L]$, this is equivalent to the theory of constructability from below + limit stages. Can this theory prove the following definability $\omega$-rule? $\textbf{Definability: }$ if $\phi_1,\phi_2, \phi_3,...$ are all ...

Recently I'm reading the paper Ramsey–Milman phenomenon, Urysohn metric spaces, and extremely amenable groups by Pestov. When it comes to the definition of an extremely amenable topological group, it claims (without proof) that (the extreme amenability) is equivalent to the existence of a left i...

I am trying to understand paragraph 1.6 of Lusztig's paper "Character Sheaves I". The basic setup is that $X$ is a smooth irreducible variety over a field $k=\overline{k}$, $D_i, i=1,...,r$ are smooth normal crossing divisors and $\mathcal{L}$ is $\overline{\mathbb{Q}}_l$-local system of rank one...

Let $A$ be a densely-defined, positive, self-adjoint operator with compact resolvent on a Hilbert space $H$. Then, $\text{Range}(1+A)=H$ and there is a basis for $H$ consisting of eigenvectors of $1+A$. Assume also that $D\subset H$ is a core domain for $A$; that is, $D$ is dense in $\text{Dom(A)...