Kaczmarz holography: holographic projection in the Fraunhofer region

Abstract: The Kaczmarz algorithm is an iterative method for solving linear equations in the form of Ax = b. It is widely used in computed tomography (CT) and digital signal processing (DSP) but has yet to be adopted in computer-generated holography (CGH). Phase retrieval algorithms such as Gerchberg-Saxton or Fienup are significantly more popular in this field, however, in this paper we propose a unique and alternative approach to projecting a replay field through Discrete Fourier Transform (DFT) matrices and have shown… Show more

“…From the work previously conducted on Kaczmarz holographic projections [12], it is noticeable the image quality for Kaczmarz outperforms Gerchberg-Saxton in 10 iterations. However, the main drawbacks of implementing Kaczmarz are its slow running time and ability to solely be adopted on smaller images 128x128 pixels since it relies on discrete Fourier transform (DFT) matrices.…”

“…Our earlier investigation, on Kaczmarz holographic projections in the Fraunhofer region [12] revealed that while very high quality replay fields are generated, it is still comparatively slower than the more widely used Gerchberg-Saxton. The Kaczmarz algorithm iterates the Ax component in a linear equation on a row-by-row basis and therefore explains the slower running of this phase retrieval method.…”

“…More recently, the Kaczmarz algorithm was shown to be effective in computer-generated holography, projecting holographic images in the Fraunhofer region [12]. It is therefore very suitable to resolving the phase retrieval problem associated with holographic projections.…”

“…Our previous work on using the Kaczmarz algorithm to project replay fields in the Fraunhofer region [12] demonstrates that while high image quality is obtainable, its row-action approach makes it much slower than alternative methods that compute the product of Ax simultaneously. Furthermore, iterative algorithms such as Gerchberg-Saxton use Fast Fourier Transforms (FFTs), a significantly more time-effective approach to resolve this phase retrieval problem, O(NlogN) as opposed to O(N 2 ).…”

“…As well as only being capable of reconstructing replay fields of smaller dimensions, the Kaczmarz algorithm is also slower than fast Fourier transform (FFT) based algorithms such as the Gerchberg-Saxton, as seen in our previous work [12]. As a result, alternative algorithms that compute the full image simultaneously rather than relying on row-by-row iteration, as seen by Kaczmarz, were evaluated.…”

Cimmino simultaneously iterative holographic projection

“…From the work previously conducted on Kaczmarz holographic projections [12], it is noticeable the image quality for Kaczmarz outperforms Gerchberg-Saxton in 10 iterations. However, the main drawbacks of implementing Kaczmarz are its slow running time and ability to solely be adopted on smaller images 128x128 pixels since it relies on discrete Fourier transform (DFT) matrices.…”

“…Our earlier investigation, on Kaczmarz holographic projections in the Fraunhofer region [12] revealed that while very high quality replay fields are generated, it is still comparatively slower than the more widely used Gerchberg-Saxton. The Kaczmarz algorithm iterates the Ax component in a linear equation on a row-by-row basis and therefore explains the slower running of this phase retrieval method.…”

“…More recently, the Kaczmarz algorithm was shown to be effective in computer-generated holography, projecting holographic images in the Fraunhofer region [12]. It is therefore very suitable to resolving the phase retrieval problem associated with holographic projections.…”

“…Our previous work on using the Kaczmarz algorithm to project replay fields in the Fraunhofer region [12] demonstrates that while high image quality is obtainable, its row-action approach makes it much slower than alternative methods that compute the product of Ax simultaneously. Furthermore, iterative algorithms such as Gerchberg-Saxton use Fast Fourier Transforms (FFTs), a significantly more time-effective approach to resolve this phase retrieval problem, O(NlogN) as opposed to O(N 2 ).…”

“…As well as only being capable of reconstructing replay fields of smaller dimensions, the Kaczmarz algorithm is also slower than fast Fourier transform (FFT) based algorithms such as the Gerchberg-Saxton, as seen in our previous work [12]. As a result, alternative algorithms that compute the full image simultaneously rather than relying on row-by-row iteration, as seen by Kaczmarz, were evaluated.…”

Cimmino simultaneously iterative holographic projection

Holographic phase retrieval via Wirtinger flow: Cartesian form with auxiliary amplitude