Progress in astronomy in the 21st century is contingent on the ability to extract useful information from complex and noisy datasets. This requires modeling the data-generating process – a complex combination of the physical phenomenon of interest and the “noise”. The goal is to create an approximate model that captures the essence of this process and then fit it to the data. This thesis covers the development of new methods and tools for almost all aspects of the data analysis process in two fields of astronomy: gravitational microlensing and occultation/eclipse mapping. In both fields, the objective is to infer the physical properties of exoplanets, stars, or dark compact objects by measuring the brightness variations of a light source as a function of time. Building on recent advancements in statistics, machine learning, and computer science, I developed a new open-source package called caustics for computing the microlensing magnification in single, binary, and triple-lens microlensing events. I also tackled foundational questions on the statistical analysis of single-lens and multiple-lens microlensing events, developing a new paradigm for modeling degenerate single-lens microlensing events and demonstrating the flaws of commonly used methods for analyzing multiple-lens microlensing events. Moreover, I built models for reconstructing two-dimensional emission maps of spherical bodies, exoplanets, and Solar System objects from one-dimensional photometric occultation light curves. Together with collaborators, I developed a novel method for reconstructing spatial maps of volcanic emission on Jupiter’s moon Io from occultation light curves and used the same method for exoplanet eclipse mapping to explore the possibility of detecting weather and climate change on Hot Jupiters using simulated photometric JWST secondary eclipse light curves.
See Chapter 8 of the thesis for a bullet point summary of the key findings and contributions of this thesis.
There is a link to the left of each figure that points to the script (located in src/scripts/) that generated the figure. Unfortunately much of the data I used in the thesis is not public so I could not share it. The data I could share is available for download here: https://research-repository.st-andrews.ac.uk/handle/10023/27130
If you are interested in reproducing any of the results of the thesis, please contact me. I will be happy to help.