There is an identification taking place. Associated to the map T : \mathcal{T}(M)\times\mathcal{T}(M) \to \mathcal{T}(M), we have the map \hat{T} : \mathcal{T}(M)\times\mathcal{T}(M)\times\mathcal{T}^*(M) \to \mathcal{C}^{\infty}(M) ...

F(y) = \int_{-\infty}^y f(x) \ dx if y< 0 F(y) = \int_{-2}^y \frac {-x}{10} \ dx if y\ge 0 F(y) = \int_{-2}^0 \frac {-x}{10} \ dx + \int_0^y \frac {x}{10} \ dx Giving you a piece-wise ...

The reason your integral is done using just one of those three ranges is that the entire intevar of integration [2,3] resides in the middle range -1<x\leq 3. If your integral had been, say, \int_{-2}^4 |x^2-2x-3|dx ...

For convolution, you want to think about everything as happening along the line x+y=a. Consider that line, and how it relates to the rectangle where 0 \leq x \leq 2 and 0 \leq y \leq 1 (i.e. ...

Since f is Riemann integrable on [-a,a], by the Riemann criterion, for any \epsilon > 0 there exists a partition P' of [-a,a] such that U(f,P') - L(f,P') < \epsilon. If the point x=0 is ...

In the physics book you read, the expression \int_0^t f(t) dt is meant to represent \int_0^tf(s)ds. Writing \int_0^t dt = t is an abuse of notation: the symbol t was used twice with ...