Generalized Riemann Integral: Improper Version

improper-integrals integration functional-analysis banach-spaces

Solution 1:

Yes, it holds!

As it is continuous it is Bochner measurable by Pettis's criterion.

As it is absolutely integrable it is also Bochner integrable.

But it is bounded so on subspaces of finite measure Riemann integrable.

Thus by dominated convergence also improperly Riemann integrable.

Related

If $f \geq 0$ is continuous and $\int_{a}^{b} f(x) \, dx = 0$, then $f =0$
How to calculate the area of a polygon? [duplicate]
Representing a given number as the sum of two squares.
If $4\mid a+bc$ and $6\mid b+ac$ prove that $2\mid a^2-b^2$
Problem involving many squares and several variables.
Finding the distribution of $\|X-\mu \|_\Sigma^2$ with $X \sim N(\mu,\Sigma)$
Is this Cornu spiral positively oriented or not?.
Iterate through string array in Java
Dart, how to create a future to return in your own functions?
Is Scala's actors similar to Go's coroutines?
in Emacs, edit multiple lines at once
How to always show the vertical scrollbar in a browser?