In Fourier transform profilometry, an object shape is evaluated through phase distribution extracted from an angled projected fringe pattern which is regarded as the carrier, so the existence of the carrier phase is unavoidable. Ideally, the carrier phase is linear, whereas in an actual measurement system the linearity of the carrier phase will be destructed by the imaging aberration and the divergent projection. In this paper Zernike polynomials, due to their orthogonality and the correspondence with Seidel aberrations, are used to approximate the nonlinear carrier phase and then remove the influence of carrier phase accurately. Both the theoretical analysis and the experiment results are presented. By comparison with existing carrier removal methods, this proposed method has the advantage of single-frame acquisition and less error, and is applicable for both nonlinear carrier and dynamic measurement.

• 出版日期2013-3
• 单位四川大学