| 31. | The solution is broken up into plane waves.
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| 32. | Special examples are the Gaussian quadrature for polynomials and the Discrete Fourier Transform for plane waves.
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| 33. | The term is often used to mean the special case of a monochromatic, homogeneous plane wave.
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| 34. | On the down side, scattering calculations using the reciprocal lattice basically consider an incident plane wave.
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| 35. | Of the plane wave is of major interest.
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| 36. | Which represents a propagating or exponentially decaying uniform plane wave solution to the homogeneous wave equation.
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| 37. | In a plane wave for instance, the wave intensity is the same everywhere at all times.
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| 38. | An example is the plane wave given by
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| 39. | In linear uniform media, a wave solution can be expressed as a superposition of plane waves.
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| 40. | All spatial dependence of the individual plane wave components is described explicitly via the exponential functions.
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