We introduce a novel parameterization for spherical distributions that is based on a point located inside the sphere, which we call a pivot. The pivot serves as the center of a straight-line projection that maps solid angles onto the opposite side of the sphere. By transforming spherical distributions in this way, we derive novel parametric spherical distributions that can be evaluated and importance-sampled from the original distributions using simple, closed-form expressions. Moreover, we prove that if the original distribution can be sampled and/or integrated over a spherical cap, then so can the transformed distribution. We exploit the properties of our parameterization to derive efficient spherical lighting techniques for both real-ti...
In this dissertation, we first introduce an equal-area spherical map, HEALPix, which is borrowed fro...
Quasi-Monte Carlo (QMC) methods exhibit a faster convergence rate than that of classic Monte Carlo m...
Fourier analysis, and representation of circular distributions in terms of their Fourier coefficient...
Spherical Sampling by Archimedes ' Theorem In this paper we present a simple and efficient algo...
The spherical sampling of the incident radiance function entails a high computational cost. Therefor...
Stochastic shading with area lights requires methods to sample the light sources. For diffuse materi...
We present new methods for efficient estimation of the radiance incoming from disk-shaped light sour...
International audienceQuasi-Monte Carlo (QMC) methods exhibit a faster convergence rate than that of...
The sampling of certain solid angle is a fundamental operation in realistic image synthesis, where t...
In this paper we present a simple and efficient algorithm for generating uniformaly distributed samp...
The ability to generate random samples that match a spherical PDF given in terms of spherical harmon...
We present an efficient approach for solving the spherical parameterization problem. The essence of ...
We present a novel plenoptic sampling scheme that permits an efficient representation of the full li...
International audienceThe objective of this work is to propose a new algorithm to fit a sphere on a ...
In this paper, we present a new and efficient spherical harmonics decomposition for spherical functi...
In this dissertation, we first introduce an equal-area spherical map, HEALPix, which is borrowed fro...
Quasi-Monte Carlo (QMC) methods exhibit a faster convergence rate than that of classic Monte Carlo m...
Fourier analysis, and representation of circular distributions in terms of their Fourier coefficient...
Spherical Sampling by Archimedes ' Theorem In this paper we present a simple and efficient algo...
The spherical sampling of the incident radiance function entails a high computational cost. Therefor...
Stochastic shading with area lights requires methods to sample the light sources. For diffuse materi...
We present new methods for efficient estimation of the radiance incoming from disk-shaped light sour...
International audienceQuasi-Monte Carlo (QMC) methods exhibit a faster convergence rate than that of...
The sampling of certain solid angle is a fundamental operation in realistic image synthesis, where t...
In this paper we present a simple and efficient algorithm for generating uniformaly distributed samp...
The ability to generate random samples that match a spherical PDF given in terms of spherical harmon...
We present an efficient approach for solving the spherical parameterization problem. The essence of ...
We present a novel plenoptic sampling scheme that permits an efficient representation of the full li...
International audienceThe objective of this work is to propose a new algorithm to fit a sphere on a ...
In this paper, we present a new and efficient spherical harmonics decomposition for spherical functi...
In this dissertation, we first introduce an equal-area spherical map, HEALPix, which is borrowed fro...
Quasi-Monte Carlo (QMC) methods exhibit a faster convergence rate than that of classic Monte Carlo m...
Fourier analysis, and representation of circular distributions in terms of their Fourier coefficient...