Michael Z. Williams scite author profile

We describe a new, multiply subtractive Kramers-Kronig (MSKK)method to find the optical constants of a material from a singletransmittance or reflectance spectrum covering a small frequencydomain. The MSKK method incorporates independent measurements ofn and k at one or more reference wave-numbervalues to minimize errors due to extrapolations of the data. Anunexpected connection between the MSKK equations and the interpolationtheory allows us to derive the equations from an interpolationtheorem. We found that the locations of the reference points affectthe accuracy of the values determined for the optical constants andthat the optimal spacing of N reference data points isrelated to the zeros of a suitably transformed Chebychev polynomial oforder N. We discuss our efforts to optimize both the numberand the spacing of these reference points and apply our method to sometest spectra.

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Some results on the differential-difference equation ẋ(t) = ∑i=0N Aix(t−Ti)∗

Bailey

Williams

1966

Journal of Mathematical Analysis and Applications

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A Triple Product of Vectors in Four-Space

Williams

Stein

1964

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A Triple Product of Vectors in Four-Space

Williams

Stein

1964

Mathematics Magazine

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Determination of the optical constants of a thin film from transmittance measurements of a single film thickness

Palmer

Williams

1985

Appl. Opt.

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