In physics, a plane wave is a special case of wave or field: a physical quantity whose value, at any moment, is constant through any plane that is perpendicular to a fixed direction in space.[1]
For any position in space and any time , the value of such a field can be written as
The values of the field may be scalars, vectors, or any other physical or mathematical quantity. They can be complex numbers, as in a complex exponential plane wave.
When the values of are vectors, the wave is said to be a longitudinal wave if the vectors are always collinear with the vector , and a transverse wave if they are always orthogonal (perpendicular) to it.
Special types
Traveling plane wave
Often the term "plane wave" refers specifically to a traveling plane wave, whose evolution in time can be described as simple translation of the field at a constant wave speed along the direction perpendicular to the wavefronts. Such a field can be written as
Sinusoidal plane wave
The term is also used, even more specifically, to mean a "monochromatic" or sinusoidal plane wave: a travelling plane wave whose profile is a sinusoidal function. That is,
A true plane wave cannot physically exist, because it would have to fill all space. Nevertheless, the plane wave model is important and widely used in physics. The waves emitted by any source with finite extent into a large homogeneous region of space can be well approximated by plane waves when viewed over any part of that region that is sufficiently small compared to its distance from the source. That is the case, for example, of the light waves from a distant star that arrive at a telescope.
Plane standing wave
A standing wave is a field whose value can be expressed as the product of two functions, one depending only on position, the other only on time. A plane standing wave, in particular, can be expressed as
This representation is not unique, since the same field values are obtained if and are scaled by reciprocal factors. If is bounded in the time interval of interest (which is usually the case in physical contexts), and can be scaled so that the maximum value of is 1. Then will be the maximum field magnitude seen at the point .
Properties
A plane wave can be studied by ignoring the directions perpendicular to the direction vector ; that is, by considering the function as a wave in a one-dimensional medium.
Any local operator, linear or not, applied to a plane wave yields a plane wave. Any linear combination of plane waves with the same normal vector is also a plane wave.
For a scalar plane wave in two or three dimensions, the gradient of the field is always collinear with the direction ; specifically, , where is the partial derivative of with respect to the first argument.
The divergence of a vector-valued plane wave depends only on the projection of the vector in the direction . Specifically,
See also
References
- ^ Brekhovskikh, L. (1980). Waves in Layered Media (2 ed.). New York: Academic Press. pp. 1–3. ISBN 9780323161626.
- ^ Jackson, John David (1998). Classical Electrodynamics (3 ed.). New York: Wiley. p. 296. ISBN 9780471309321.