Problem with definition of tangent vectors as derivations

Question

It is well-known that one can describe tangent vectors to a smooth manifold $M$ as derivations on germs of functions, see this question. However, according to "Riemannsche Geometrie im Großen" by Gromoll, Klingenberg and Meyer, §1.1.3, A(i), there is an infinite-dimensional vector space of $\mathbb R$-linear maps $\partial\colon C^r(M)\to\mathbb R$ satisfying the usual product rule $$\partial(fg)=\partial f\cdot g(p)+f(p)\cdot\partial g$$ for function germs $f$, $g$ at $p$, where $p$ is a point on a finite-dimensional $C^r$-manifold $M$ with $1\le r<\infty$. Is there any accessible description of "strange" derivations that do not originate from tangent vectors in the classical sense, that is, either from velocities of $C^r$-curves, or from a coordinate description behaving correctly under coordinate changes?

Answer 1

See this note describing the algebraic tangent space of a $C^k$ manifold. In particular, on $\mathbb{R}$, there exists a basis of the cotangent space $\mathfrak{m}_p\, / {\mathfrak{m}_p}^2$ containing the functions $|x-p|^{k+\alpha}$ for all $\alpha \in (0, 1)$.

We can therefore define a derivation at $p$ which maps $|x-p|^{k+\frac{1}{2}}$ to $1$ and every other basis element to $0$.

Answer 2

I think there are no "derivations that do not originate from tangent vectors in the classical sense".

Indeed, any derivation $D$ must satisfy the chain rule $$(Df)(p)=\sum_{i=1}^n(D_i f)(p)(Dx^i)(p)$$ at every point $p\in M$, where $f$ is a smooth enough function on $M$, $x^i$ is the $i$th coordinate function near $p$, and $(D_i f)(p)$ is the partial derivative of $f$ at $p$ wrt the $i$th coordinate. Letting now $v=(v^1,\dots,v^n)=((Dx^1)(p),\dots,(Dx^n)(p))$, we get $$(Df)(p)=\sum_{i=1}^n(D_i f)(p)v^i=(D_v f)(p),$$ the directional derivative of $f$ at $p$ in the direction of $v$.