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I am hoping there are some interesting examples of non-Gaussian UII measures with infinitely many degrees of freedom. If they do not exist, I will be very interested to see the proof. …

I've read that toposes are extremely important in modern mathematics, but I find the definitions and examples given on the nLab page a little too abstract to understand. … Can you provide some examples of toposes which are of use to analysts? e.g., toposes where the objects consist of topological spaces, measure spaces, etc. …

Consider the measurable space $2^{\mathbb R}$, equipped with the tensor-product $\sigma$-algebra. Famously, this space has a measurable structure which is not generated by a topology (see this answer) …

Let $X$ be a topological space, and let $\operatorname{CL}(X)$ be its hyperspace. That is, $\operatorname{CL}(X)$ is the set of closed subsets of $X$, equipped with the minimal topology so that the ca …

Is there a book or survey article with a rich set of examples? Here is the particular example which motivates this question. …

I can't seem to reply to Martin's response so I'm making a new one. The first question one asks in percolation theory is whether an infinite open cluster exists. The zero-one law applies because as …