Fast etalon spacing estimates for optics and photonics. Choose units, include angle, and compare outputs. Reduce tuning errors and validate cavity design decisions today.
For a plane-parallel etalon, adjacent transmission peaks are separated by the free spectral range (FSR):
Δν = c / (2 n L cosθ)Δσ = 1 / (2 n L cosθ)Δλ ≈ λ₀² / (2 n L cosθ)m ≈ 2 n L cosθ / λ₀If reflectivity R is provided, the calculator estimates finesse F ≈ π√R/(1−R) and linewidth δν ≈ Δν/F.
These sample values illustrate typical magnitudes. Your results depend on optics and alignment.
| L | n | θ | λ₀ | Δν (approx) | Δλ (approx) |
|---|---|---|---|---|---|
| 10 mm | 1.000 | 0° | 1550 nm | ~14.99 GHz | ~0.120 nm |
| 1 mm | 1.450 | 0° | 1064 nm | ~103.38 GHz | ~0.390 nm |
| 200 µm | 1.000 | 5° | 633 nm | ~0.75 THz | ~1.00 nm |
An etalon forms a short interferometric cavity that transmits only discrete resonant frequencies. The free spectral range (FSR) is the separation between neighboring transmission peaks. In frequency units it is typically expressed in GHz or THz, while in wavenumber it may be written in cm−1. A larger FSR means fewer resonances inside a given optical bandwidth, which simplifies filtering and mode selection in lasers.
The dominant term is the optical round trip, 2nL. If you double the spacing L, the FSR halves. If you increase refractive index from 1.00 to 1.50 at fixed thickness, the FSR drops by one third. For example, an air-spaced 10 mm etalon gives roughly 15 GHz spacing, while a 1 mm glass etalon (n ≈ 1.45) reaches about 103 GHz, matching typical laboratory filter components.
Changing incidence angle modifies the effective path length by cos(θ). Small angles provide gentle tuning without changing hardware. At 5° the cosine factor is about 0.996, so the FSR changes by only a few tenths of a percent. Larger angles increase sensitivity but also raise alignment demands and may introduce polarization or walk-off effects in practical optics.
Many users think in nanometers rather than hertz. The wavelength spacing depends on the chosen center wavelength λ0 through Δλ ≈ λ02/(2nLcosθ). This is why the same etalon has a larger Δλ in the infrared than in the visible. At 1550 nm, a 10 mm air etalon yields around 0.12 nm, whereas at 633 nm the same cavity produces a much smaller Δλ.
The interference order m ≈ 2nLcosθ/λ0 helps sanity-check geometry. For millimeter-scale cavities at near‑IR wavelengths, m is often in the thousands to tens of thousands. If your computed order is unexpectedly small, revisit unit selections and confirm that L is not entered in the wrong scale.
Reflectivity controls how sharp each transmission peak becomes. With an entered reflectivity R, this calculator estimates finesse F ≈ π√R/(1−R) and an approximate linewidth δν ≈ FSR/F. As a reference, R = 0.90 gives F ≈ 29.8, so a 15 GHz FSR corresponds to about 0.50 GHz linewidth.
Choose a large FSR when you want aggressive mode suppression or coarse comb spacing. Choose a smaller FSR for dense spectral sampling, such as calibrating spectrometers. Combine FSR with linewidth to ensure peaks are narrow enough for your resolution target but not so narrow that temperature drift dominates performance.
Engineering workflows often require repeatable records. After calculation, export CSV for quick spreadsheets or PDF for lab notebooks and design reviews. Keep notes on L, n, angle, and λ0, because small differences in units can move results by orders of magnitude. This page is designed for fast iteration across scenarios.
Millimeter to centimeter cavities often produce FSR values from a few GHz up to hundreds of GHz. Very thin plates can reach the THz range, especially in air-spaced configurations.
FSR is inversely proportional to the optical path length 2nLcosθ. A thicker cavity stores more phase per round trip, so resonances occur more closely spaced in frequency.
The Δλ expression assumes small spacing compared with the center wavelength. It is accurate for many optical filters where Δλ is much less than λ₀, but large spacings warrant frequency-based comparisons.
Yes. Many materials are dispersive, so n changes with λ. Use an index value appropriate to your operating wavelength, especially for broadband designs or precision spectrometer work.
Use the intensity reflectivity of the etalon surfaces at your wavelength. If coatings differ on each side, a more detailed model is needed, but a single representative R gives useful first estimates.
Angle tuning changes effective path length, but it can also shift beam position and polarization response. Small angles are typically easier to manage and keep results closer to the ideal cosine model.
Real systems include dispersion, wedge errors, temperature drift, and non-normal incidence inside the medium. Verify units, use the correct n at λ₀, and consider calibration against a known reference source.
Important Note: All the Calculators listed in this site are for educational purpose only and we do not guarentee the accuracy of results. Please do consult with other sources as well.