General Stokes' Theorem

Theorem
Let $\omega$ be a smooth $\paren {n - 1}$-form with compact support on a smooth $n$-dimensional oriented manifold $X$.

Let the boundary of $X$ be $\partial X$.

Then:
 * $\ds \int_{\partial X} \omega = \int_X \rd \omega$

where $\d \omega$ is the exterior derivative of $\omega$.

Special Case
Let there exist a chart:
 * $x = \tuple {x_1, \ldots, x_n}: V \subseteq X \to \R^n$

such that:
 * $\map \supp \omega \subseteq V$

where:
 * $\map \supp \omega = \overline {\set {p \in M : \map \omega p \ne 0} }$

We may suppose that $V$ is relatively compact.

Thus, by composing $x$ with a translation, we may suppose that:
 * $\ds \map x V \subseteq \mathbb H^n = \set {\tuple {x_1, \ldots, x_n} \in \R^n : x_1 < 0}$

We have, in the coordinates $x$:
 * $\ds \omega = \sum_{i \mathop = 1}^n f_i \rd x_1 \wedge \cdots \wedge \hat {\d x}_i \wedge \cdots \wedge \d x_n$

The forms:
 * $\hat {\d x}_i := \d x_1 \wedge \cdots \wedge \hat {\d x}_i \wedge \cdots \wedge \d x_n$

vanish on the tangent space to $\mathbb H^n$ for $i > 1$

Hence we have:
 * $(1): \quad \ds \int_{\partial \mathbb H^n} \omega = \int_{\partial \mathbb H^n} f_1 \hat {\d x}_1$

Moreover:

so that:
 * $\ds \int_{\mathbb H^n} \rd \omega = \sum_{i \mathop = 1}^n \int_{\mathbb H^n} \frac {\partial f_i} {\partial x_i} \rd x_1 \wedge \cdots \wedge \d x_n$

Let $i > 1$.

Then:

Let $i = 1$.

Then:

So:
 * $\ds \int_{\mathbb H^n} \rd \omega = \int_{\partial \mathbb H^n} f_1 \, \hat {\d x}_1$

Together with $(1)$, this establishes the result.

General Case
Let $\omega$ be a smooth $\paren {n - 1}$-form with compact support on a smooth $n$-dimensional oriented manifold $X$.

Choose a finite family of relatively compact charts $V_1, \ldots, V_k$ on $X$ such that:
 * $\ds \map \supp \omega \subseteq \bigcup_{i \mathop = 1}^k V_i$

Choose a partition of unity:
 * $\chi_1, \ldots, \chi_k$

with $\chi_1 + \cdots + \chi_k = 1$ subordinate to the cover $\set {V_1, \ldots, V_k}$.

Put:
 * $\omega_i = \chi_i \omega$

Then we have:

Moreover, $\map \supp {\omega_i} \subset V_i$ by definition.

Let the boundary of $X$ be $\partial X$.

Therefore, by the special case above, Stokes' theorem holds for each $\omega_i$.

Hence we have:
 * $\ds \int_X \rd \omega = \sum^k_{i \mathop = 1} \int_x \rd \omega_i = \sum^k_{i \mathop = 1} \int_{\partial X} \omega_i = \int_{\partial X} \omega$

Also see

 * Implications of Stokes' Theorem