Difference between revisions of "Divergence theorem"
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− | + | {{TEX|done}} | |
+ | {{MSC|26B20}} | ||
− | + | The divergence theorem gives a formula in the [[Integral calculus|integral calculus]] of functions in several variables that establishes a link between an $n$-fold integral over a domain and an $n-1$-fold integral over its boundary. The formula, which can be regarded as a direct generalization of the [[Fundamental theorem of calculus]], is often referred to as: | |
+ | Green formula, Gauss-Green formula, Gauss formula, Ostrogradski formula, Gauss-Ostrogradski formula or Gauss-Green-Ostrogradski formula. | ||
− | + | Let us recall that, given an open set $U\subset \mathbb R^n$, a [[Vector field|vector field]] on $U$ is a map $v: U \to \mathbb R^n$. If $v$ is differentiable and the components of the vector field are denoted by $v_1, \ldots, v_n$, then the [[Divergence|divergence]] of $v$ is given by the function | |
+ | \[ | ||
+ | {\rm div}\, v := \sum_{i=1}^n \frac{\partial v_i}{\partial x_i}\, . | ||
+ | \] | ||
− | + | The divergence theorem asserts that | |
− | + | '''Theorem 1''' | |
+ | If $v$ is a $C^1$ vector field, $\partial U$ is regular (i.e. can be described locally as the graph of a $C^1$ function) and $U$ is bounded, then | ||
+ | \begin{equation}\label{e:divergence_thm} | ||
+ | \int_U {\rm div}\, v = \int_{\partial U} v\cdot \nu\, , | ||
+ | \end{equation} | ||
+ | where $\nu$ denotes the unit normal to $\partial U$ pointing towards the "exterior" (namely $\mathbb R^n \setminus \overline{U}$). | ||
− | + | When the dimension $n$ is $1$ and $U$ is an interval $I =[a,b]$, the left hand side of \eqref{e:divergence_thm} is given by | |
+ | \[ | ||
+ | \int_a^b f' (x)\, dx | ||
+ | \] | ||
+ | and the right hand side is given by $f(b)-f(a)$: the theorem is therefore a generalization of the [[Fundamental theorem of calculus]]. For larger $n$ the integral on the right hand side of \eqref{e:divergence_thm} is a surface integral, which is computed using the [[Area formula]], and is called [[Flux of a vector field|flux of the vector field]] $v$ through $\partial U$. If $v$ is compactly supported in a region $V$ where $U\cap V$ is the subgraph of a function $f$, then the flux of $v$ takes a simple form. More precisely, assume that $U\cap V = \{(x_1, \ldots, x_n)\in V : x_n < f(x_1, \ldots, x_{n-1})\}$. Then, under the assumption that $v$ vanishes outside $V$, we have | ||
+ | \[ | ||
+ | \int_{\partial U} v\cdot \nu = \int \left(v_n (x', f (x')) | ||
+ | - \frac{\partial f}{\partial x_1} (x') v_1 (x', f(x')) | ||
+ | - \ldots - \frac{\partial f}{\partial x_{n-1}} (x') v_{n-1} (x', f (x'))\right)\, dx'\, , | ||
+ | \] | ||
+ | where $x'= (x_1, \ldots, x_{n-1})$. This formula can be used, together with a [[Partition of unity|partition of unity]], to compute (or define) the flux of a general vector field $v$. | ||
− | + | '''Remark 2''' The three key assumptions of Theorem 1 can be all heavily relaxed: | |
+ | * The boundedness of $U$ might be dropped if we assume that the vector field $v$ has suitable decay properties for $|x|\to \infty$. | ||
+ | * The regularity of $\partial U$ might be considerably weakened. For instance the theorem holds when $\partial U$ is piecewise $C^1$ and the singularities are "corner-like". More generaly, it still holds if $\partial U$ is Lipschitz. An important generalization holds for [[Set of finite perimeter|sets of finite perimeter]]: in this case the flux of the vector field through $\partial U$ must be suitably defined in a measure theoretic sense. | ||
+ | * The formula still holds when $v$ belongs to the [[Sobolev space]] $W^{1,p}$: in this case the right hand side of \eqref{e:divergence_thm} must be suitably interpreted, since $v$ is not necessarily continuous. Note that the almost everywhere differentiability of $v$ is not sufficient to guarantee \eqref{e:divergence_thm}, even when $v$ is continuous: see [[Absolute continuity]] for a counterexample. | ||
+ | Simultaneous weakenings of more than one assumption need to be handled with care. | ||
− | + | '''Remark 3''' The formula has also important generalizations of geometrical flavour. In particular, it holds on regular open subsets of [[Riemannian manifold|Riemannian manifolds]]. A far-reaching generalization is given by the [[Stokes formula]], using the language of [[Differential form|differential forms]]. | |
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− | + | '''Remark 4''' Theorem 1 is attributed to different people. The $2$-dimensional case is credited often to Green, see {{Cite|Gr}}. The $3$-dimensional formula is attributed to Gauss, who proved a particular case in 1813, and to Ostrogradski (see {{Cite|Os1}}), who later generalized it to general dimension, {{Cite|Os2}}. Sometimes also Riemann is credited. However, it must be noted that the formula is already present in the works of Euler and other mathematician of the 18th century. | |
====References==== | ====References==== | ||
− | + | {| | |
+ | |valign="top"|{{Ref|CH}}|| R. Courant, D. Hilbert, "Methods of mathematical physics. Partial differential equations" , '''2''' , Interscience (1965) (Translated from German) {{MR|0195654}} {{ZBL|}} | ||
+ | |- | ||
+ | |valign="top"|{{Ref|Gr}}|| G. Green, "An essay on the application of mathematical analysis to the theories of electricity and magnetism" , Nottingham (1828) (Reprint: Mathematical papers, Chelsea, reprint, 1970, pp. 1–82) {{MR|}} {{ZBL|21.0014.03}} | ||
+ | |- | ||
+ | |valign="top"|{{Ref|Kr}}|| A.M. Krall, "Applied analysis" , Reidel (1986) pp. 380 | ||
+ | |- | ||
+ | |valign="top"|{{Ref|Os1}}|| M.V. Ostrogradski, ''Mém. Acad. Sci. St. Petersbourg. Sér. 6. Sci. Math. Phys. et Naturelles'' , '''1''' (1831) pp. 117–122 | ||
+ | |- | ||
+ | |valign="top"|{{Ref|Os2}}|| M.V. Ostrogradski, ''Mém. Acad. Sci. St. Petersbourg. Sér. 6. Sci. Math. Phys. et Naturelles'' , '''1''' (1838) pp. 35–58 | ||
+ | |- | ||
+ | |valign="top"|{{Ref|Tr}}|| H. Triebel, "Analysis and mathematical physics" , Reidel (1986) pp. Sect. 9.3.1 | ||
+ | |- | ||
+ | |valign="top"|{{Ref|Wi}}|| A.P. Wills, "Vector analysis with an introduction to tensor analysis" , Dover, reprint (1958) pp. 97ff | ||
+ | |- | ||
+ | |valign="top"|{{Ref|vW }}||C. von Westenholz, "Differential forms in mathematical physics" , North-Holland (1981) pp. 286ff | ||
+ | |- | ||
+ | |} |
Revision as of 10:07, 3 February 2014
2020 Mathematics Subject Classification: Primary: 26B20 [MSN][ZBL]
The divergence theorem gives a formula in the integral calculus of functions in several variables that establishes a link between an $n$-fold integral over a domain and an $n-1$-fold integral over its boundary. The formula, which can be regarded as a direct generalization of the Fundamental theorem of calculus, is often referred to as: Green formula, Gauss-Green formula, Gauss formula, Ostrogradski formula, Gauss-Ostrogradski formula or Gauss-Green-Ostrogradski formula.
Let us recall that, given an open set $U\subset \mathbb R^n$, a vector field on $U$ is a map $v: U \to \mathbb R^n$. If $v$ is differentiable and the components of the vector field are denoted by $v_1, \ldots, v_n$, then the divergence of $v$ is given by the function \[ {\rm div}\, v := \sum_{i=1}^n \frac{\partial v_i}{\partial x_i}\, . \]
The divergence theorem asserts that
Theorem 1 If $v$ is a $C^1$ vector field, $\partial U$ is regular (i.e. can be described locally as the graph of a $C^1$ function) and $U$ is bounded, then \begin{equation}\label{e:divergence_thm} \int_U {\rm div}\, v = \int_{\partial U} v\cdot \nu\, , \end{equation} where $\nu$ denotes the unit normal to $\partial U$ pointing towards the "exterior" (namely $\mathbb R^n \setminus \overline{U}$).
When the dimension $n$ is $1$ and $U$ is an interval $I =[a,b]$, the left hand side of \eqref{e:divergence_thm} is given by \[ \int_a^b f' (x)\, dx \] and the right hand side is given by $f(b)-f(a)$: the theorem is therefore a generalization of the Fundamental theorem of calculus. For larger $n$ the integral on the right hand side of \eqref{e:divergence_thm} is a surface integral, which is computed using the Area formula, and is called flux of the vector field $v$ through $\partial U$. If $v$ is compactly supported in a region $V$ where $U\cap V$ is the subgraph of a function $f$, then the flux of $v$ takes a simple form. More precisely, assume that $U\cap V = \{(x_1, \ldots, x_n)\in V : x_n < f(x_1, \ldots, x_{n-1})\}$. Then, under the assumption that $v$ vanishes outside $V$, we have \[ \int_{\partial U} v\cdot \nu = \int \left(v_n (x', f (x')) - \frac{\partial f}{\partial x_1} (x') v_1 (x', f(x')) - \ldots - \frac{\partial f}{\partial x_{n-1}} (x') v_{n-1} (x', f (x'))\right)\, dx'\, , \] where $x'= (x_1, \ldots, x_{n-1})$. This formula can be used, together with a partition of unity, to compute (or define) the flux of a general vector field $v$.
Remark 2 The three key assumptions of Theorem 1 can be all heavily relaxed:
- The boundedness of $U$ might be dropped if we assume that the vector field $v$ has suitable decay properties for $|x|\to \infty$.
- The regularity of $\partial U$ might be considerably weakened. For instance the theorem holds when $\partial U$ is piecewise $C^1$ and the singularities are "corner-like". More generaly, it still holds if $\partial U$ is Lipschitz. An important generalization holds for sets of finite perimeter: in this case the flux of the vector field through $\partial U$ must be suitably defined in a measure theoretic sense.
- The formula still holds when $v$ belongs to the Sobolev space $W^{1,p}$: in this case the right hand side of \eqref{e:divergence_thm} must be suitably interpreted, since $v$ is not necessarily continuous. Note that the almost everywhere differentiability of $v$ is not sufficient to guarantee \eqref{e:divergence_thm}, even when $v$ is continuous: see Absolute continuity for a counterexample.
Simultaneous weakenings of more than one assumption need to be handled with care.
Remark 3 The formula has also important generalizations of geometrical flavour. In particular, it holds on regular open subsets of Riemannian manifolds. A far-reaching generalization is given by the Stokes formula, using the language of differential forms.
Remark 4 Theorem 1 is attributed to different people. The $2$-dimensional case is credited often to Green, see [Gr]. The $3$-dimensional formula is attributed to Gauss, who proved a particular case in 1813, and to Ostrogradski (see [Os1]), who later generalized it to general dimension, [Os2]. Sometimes also Riemann is credited. However, it must be noted that the formula is already present in the works of Euler and other mathematician of the 18th century.
References
[CH] | R. Courant, D. Hilbert, "Methods of mathematical physics. Partial differential equations" , 2 , Interscience (1965) (Translated from German) MR0195654 |
[Gr] | G. Green, "An essay on the application of mathematical analysis to the theories of electricity and magnetism" , Nottingham (1828) (Reprint: Mathematical papers, Chelsea, reprint, 1970, pp. 1–82) Zbl 21.0014.03 |
[Kr] | A.M. Krall, "Applied analysis" , Reidel (1986) pp. 380 |
[Os1] | M.V. Ostrogradski, Mém. Acad. Sci. St. Petersbourg. Sér. 6. Sci. Math. Phys. et Naturelles , 1 (1831) pp. 117–122 |
[Os2] | M.V. Ostrogradski, Mém. Acad. Sci. St. Petersbourg. Sér. 6. Sci. Math. Phys. et Naturelles , 1 (1838) pp. 35–58 |
[Tr] | H. Triebel, "Analysis and mathematical physics" , Reidel (1986) pp. Sect. 9.3.1 |
[Wi] | A.P. Wills, "Vector analysis with an introduction to tensor analysis" , Dover, reprint (1958) pp. 97ff |
[vW ] | C. von Westenholz, "Differential forms in mathematical physics" , North-Holland (1981) pp. 286ff |
Divergence theorem. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Divergence_theorem&oldid=31299