Begin2.DVI

For arbitrary C ,
this integral implies the relation (8.53). That is, one can factor

out the constant vector C
as long as this vector is different from zero. Under these

conditions the integral relation (8.53) must hold.

Region of Integration

Green’s, Gauss’ and Stokes theorems are valid only if certain conditions are

satisfied. In these theorems it has been assumed that the integrands are continuous

inside the region and on the boundary where the integrations occur. Also assumed

is that all necessary derivatives of these integrands exist and are continuous over the

regions or boundaries of the integration. In the study of the various vector and scalar

fields arising in engineering and physics, there are times when discontinuities occur

at points inside the regions or on the boundaries of the integration. Under these

circumstances the above theorems are still valid but one must modify the theorems

slightly. Modification is done by using superposition of the integrals over each side

of a discontinuity and under these circumstances there usually results some kind of

a jump condition involving the value of the field on either side of the discontinuity.

If a region of space has the property that every simple closed curve within the

region can be deformed or shrunk in a continuous manner to a single point within

the region, without intersecting a boundary of the region, then the region is said

to be simply connected. If in order to shrink or reduce a simply closed curve to a

point the curve must leave the region under consideration, then the region is said

to be a multiply connected region. An example of a multiply connected region is

the surface of a torus. Here a circle which encloses the hole of this doughnut-shaped

region cannot be shrunk to a single point without leaving the surface, and so the

region is called a multiply-connected region.

If a region is multiply connected it usually can be modified by introducing imag-

inary cuts or lines within the region and requiring that these lines cannot be crossed.

By introducing appropriate cuts, one can usually modify a multiply connected re-

gion into a simply connected region. The theorems of Gauss, Green, and Stokes are

applicable to simply connected regions or multiply connected regions which can be

reduced to simply connected regions by introducing suitable cuts.

Example 8-12. Consider the evaluation of a line integral around a curve in a

multiply connected region. Let the multiply connected region be bounded by curves

like C 0 , C 1 ,... , C nas illustrated in figure 8-14(a).