6533b827fe1ef96bd1286794
RESEARCH PRODUCT
Shifting of wrapped phase maps in the frequency domain using a rational number
Miguel Arevalillo-herráezAhmad AbushakraMunther A. GdeisatFrancis LilleyMaen QaddouraDavid R. Burtonsubject
Rational numberApplied Mathematics0211 other engineering and technologies02 engineering and technology01 natural sciencesPhase unwrapping010309 opticssymbols.namesakeFourier transformTARobustness (computer science)Signal recoveryFrequency domain0103 physical sciencessymbolsInverse trigonometric functionsSpatial domainInstrumentationEngineering (miscellaneous)AlgorithmQC021101 geological & geomatics engineeringMathematicsdescription
The number of phase wraps in an image can be either reduced, or completely eliminated, by transforming the image into the frequency domain using a Fourier transform, and then shifting the spectrum towards the origin. After this, the spectrum is transformed back to the spatial domain using the inverse Fourier transform and finally the phase is extracted using the arctangent function. However, it is a common concern that the spectrum can be shifted only by an integer number, meaning that the phase wrap reduction is often not optimal. In this paper we propose an algorithm than enables the spectrum to be frequency shifted by a rational number. The principle of the proposed method is confirmed both by using an initial computer simulation and is subsequently validated experimentally on real fringe patterns. The technique may offer in some cases the prospects of removing the necessity for a phase unwrapping process altogether and/or speeding up the phase unwrapping process. This may be beneficial in terms of potential increases in signal recovery robustness and also for use in time-critical applications.
| year | journal | country | edition | language |
|---|---|---|---|---|
| 2016-08-16 |