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Banach spaces, function spaces, real functions, integral transforms, theory of distributions, measure theory.

19 votes

Good books on theory of distributions

One big book on distributions is the first volume of Hormander's The Analysis of Linear Partial Differential Operators. This may not be the easiest book to read, but it is comprehensive and a definiti …
13 votes

Almost orthogonal vectors

At least in the real case the buzzword is "spherical codes". https://mathworld.wolfram.com/SphericalCode.html http://neilsloane.com/packings/ The idea is to find as large as possible a set on an $n$-s …
Robin Chapman's user avatar
10 votes

Regular borel measures on metric spaces

Every discrete space is a metric space. If we consider a measurable cardinal $\kappa$ as a discrete space, then it has an ultrafilter $\mathcal{F}$ in which the intersection of fewer than $\kappa$ ele …
Robin Chapman's user avatar
8 votes

Unbounded operator bounded in a dense subset

Take a dense linear subspace $Z$ of $X$ such that $X/Z$ is infinite-dimension (algebraically). Let $x_1,x_2,\ldots$ be a sequence of elements of $X$ whose images in $X/Z$ are linearly indepdendent. We …
Robin Chapman's user avatar
5 votes

Dimension of the space of harmonic functions on the unit ball

Uncountably infinite as long as $d\ge2$. We can solve the boundary value problem for countinuous functions on the unit sphere $S$. So we get a linear injection from $C(S)$ to $H(B)$. Now the dimensio …
Robin Chapman's user avatar
4 votes
Accepted

Convex sets and projections

I presume what you want to prove is the following. Let $S$ be a nonempty closed subset of $\mathbb{R}^n$. Then if there is a point $y\in\mathbb{R}^n$ and there are at least two points $p$ and $q$ in …
Robin Chapman's user avatar
4 votes
Accepted

Uniform convergence of difference quotient

By Taylor's theorem $$\phi(t+h)=\phi(t)+h\phi'(t)+h^2\phi''(t+u(h,t)h)/2$$ where $0\le u(h,t)\le1$. So $$\phi_h(t)=\phi'(t)+h\phi''(t+u(h,t)h)/2.$$ As $\phi''$ is in $C^\infty_c$ it's pretty clear tha …
Robin Chapman's user avatar
3 votes
Accepted

Intersection of ideals in C*-algebra or even rings in general

In the most general form, for arbitrary ideals over rings, this is false. In the ring $\mathbb{Z}$ let $I_k$ be generated by $2^k$ and let $J$ be generated by $3$. Then $I_k+J=\mathbb{Z}$ for all $k$ …
Robin Chapman's user avatar
1 vote

Radii and centers in Banach spaces

The answer may be affirmative when $V$ is a reflexive Banach space. Each $T_\epsilon$ is a closed bounded convex set. If the intersection of the $T_\epsilon$ is nonempty then each element of this inte …
Robin Chapman's user avatar