Optical Companding

We introduce a new nonlinear analog optical computing concept that compresses the signal's dynamic range and realizes non-uniform quantization that reshapes and improves the signal-to-noise ratio in the digital domain

A new stochastic differential equation approach for waves in a random medium

We present a mathematical approach that simplifies the theoretical treatment of electromagnetic localization in random media and leads to closed form analytical solutions. Starting with the assumption that the dielectric permittivity of the medium has delta-correlated spatial fluctuations, and using the Ito lemma, we derive a linear stochastic differential equation for a one dimensional random medium. The equation leads to localized wave solutions. The localized wave solutions have a localization length that scales inversely with the square of the frequency of the wave in the low frequency regime, whereas in the high frequency regime, this length varies inversely with the frequency to the power of two thirds

Low Latency Computing for Time Stretch Instruments

Time stretch instruments have been exceptionally successful in discovering single-shot ultrafast phenomena such as optical rogue waves and have led to record-speed microscopy, spectroscopy, lidar, etc. These instruments encode the ultrafast events into the spectrum of a femtosecond pulse and then dilate the time scale of the data using group velocity dispersion. Generating as much as Tbit per second of data, they are ideal partners for deep learning networks which by their inherent complexity, require large datasets for training. However, the inference time scale of neural networks in the millisecond regime is orders of magnitude longer than the data acquisition rate of time stretch instruments. This underscores the need to explore means where some of the lower-level computational tasks can be done while the data is still in the optical domain. The Nonlinear Schr\"{o}dinger Kernel computing addresses this predicament. It utilizes optical nonlinearities to map the data onto a new domain in which classification accuracy is enhanced, without increasing the data dimensions. One limitation of this technique is the fixed optical transfer function, which prevents training and generalizability. Here we show that the optical kernel can be effectively tuned and trained by utilizing digital phase encoding of the femtosecond laser pulse leading to a reduction of the error rate in data classification

Phase-Stretch Adaptive Gradient-Field Extractor (PAGE)

Emulated by an algorithm, certain physical phenomena have useful properties for image transformation. For example, image denoising can be achieved by propagating the image through the heat diffusion equation. Different stages of the temporal evolution represent a multiscale embedding of the image. Stimulated by the photonic time stretch, a realtime data acquisition technology, the Phase Stretch Transform (PST) emulates 2D propagation through a medium with group velocity dispersion, followed by coherent (phase) detection. The algorithm performs exceptionally well as an edge and texture extractor, in particular in visually impaired images. Here, we introduce a decomposition method that is metaphorically analogous to birefringent diffractive propagation. This decomposition method, which we term as Phase-stretch Adaptive Gradient-field Extractor (PAGE) embeds the original image into a set of feature maps that selects semantic information at different scale, orientation, and spatial frequency. We demonstrate applications of this algorithm in edge detection and extraction of semantic information from medical images, electron microscopy images of semiconductor circuits, optical characters and finger print images. The code for this algorithm is available here (https://github.com/JalaliLabUCLA)