This PhD thesis will last 36 months, and starts in September or October 2017.
It is funded by the french ANR project CaLiTrOp.
The student will be working at INRIA Rhone-Alpes, near Grenoble, France. Advisor: Cyril Soler.
Salary: about 1600 EUR per month (all taxes off).
This PhD aims at studying the dimension of light transport operators between the infinite dimensional function spaces of light distributions (imagine, e.g., reflectance as an operator that transforms a distribution of incident light into a distribution of reflected light). In addition to be linear in these spaces, these operators are also very sparse. As a side effect, the sub-spaces of light distributions that are actually relevant during the computation of a global illumination solution always boil down to a low dimensional manifold embedded in the full space of light distributions. Reflectance over ''smooth'' materials for instance, converts incident illumination into a low dimensional set of reflected light distributions.
A first part of the work will consists in linking existing work on dimensionality analysis of light transport to the literature of eigenanalysis of Fredholm operators and resolvent theory. Simultaneously, a set of experiments will be conducted to figure out what the eigenspaces of the different operators look like. In a second step, the connection to Monte-Carlo eigenanalysis methods will be made, in order to create a generic method to compute the eigenfunctions of the transport operator in most general scenes.
In parallel, we want to leverage recent non linear dimensionality reduction methods such as Gaussian processes to implicitly parameterize low dimensional manifolds of light distributions or light operators. These parameterizations will be used to speed up computation, modification, capture and compress light distributions and light transport operators.