Optical path length: Difference between revisions

In optics, optical path length (OPL) or optical distance is the product of the geometric length of the path light follows through the system, and the index of refraction of the medium through which it propagates (OP=GL*R.I.). In many textbooks, it is symbolically written as Λ. A difference in optical path length between two paths is often called the optical path difference (OPD). Optical path length is important because it determines the phase of the light and governs interference and diffraction of light as it propagates.

Optical path diff corresponds to the phase shift undergone by the light emitted from two previously coherent sources when passed through mediums of different refractive indices. For example, a wave passed through glass will appear to travel a greater distance than an identical wave in air. This is because the source in the glass will have experienced a greater number of wavelengths due to the higher refractive index of the glass.

The OPD can be calculated from the following equation:

${\displaystyle \mathrm {OPD} =d_{1}n_{1}-d_{2}n_{2}}$

where d₁ and d₂ are the distances of the ray passing through medium 1 or 2, n₁ is the greater refractive index (e.g., glass) and n₂ is the smaller refractive index (e.g., air).

In a medium of constant refractive index, n, the OPL for a path of physical length d is just

${\displaystyle \mathrm {OPL} =nd.\,}$

If the refractive index varies along the path, the OPL is given by

${\displaystyle \mathrm {OPL} =\int _{C}n(s)\mathrm {d} s,\quad }$

where n(s) is the local refractive index as a function of distance, s, along the path C.

An electromagnetic wave propagating along a path C has the phase shift over C as if it was propagating a path in a vacuum which length is equal to the optical path length of C. Thus, if a wave is traveling through several different media, then the optical path length of each medium can be added to find the total optical path length. The optical path difference between the paths taken by two identical waves can then be used to find the phase change. Finally, using the phase change, the interference between the two waves can be calculated.

Fermat's principle states that the path light takes between two points is the path that has the minimum optical path length.

• Air mass (astronomy)
• Lagrangian optics
• Hamiltonian optics
• Fermat's principle
• Optical depth

•  This article incorporates public domain material from Federal Standard 1037C. General Services Administration. Archived from the original on 2022-01-22. (in support of MIL-STD-188).
• Jenkins, F.; White, H. (1976). Fundamentals of Optics (4th ed.). McGraw-Hill. ISBN 0-07-032330-5.