Traditional Monte Carlo (MC) integration methods use point samples to numerically approximate the underlying integral. This approximation introduces variance in the integrated result, and this error can depend critically on the sampling patterns used during integration. Most of the well known samplers used for MC integration in graphics, e.g. jitter, Latin hypercube (n-rooks), multi-jitter, are anisotropic in nature. However, there are currently no tools available to analyze the impact of such anisotropic samplers on the variance convergence behavior of Monte Carlo integration. In this work, we propose a mathematical tool in the Fourier domain that allows analyzing the variance, and subsequently the convergence rate, of Monte Carlo integrat...
The numerical calculation of integrals is central to many computer graphics algorithms such as Monte...
Poisson disk sampling is one of the most important and widely employed sampling methods for imaging ...
The standard Monte Carlo approach to evaluating multi-dimensional integrals using (pseudo)-random in...
International audienceWe propose a new spectral analysis of the variance in Monte Carlo integration,...
International audienceFourier analysis is gaining popularity in image synthesis, as a tool for the a...
This dissertation introduces a theoretical framework to study different sampling patterns in the sph...
L’échantillonnage est une étape clé dans le rendu graphique. Il permet d’intégrer la lumière arrivan...
Sampling is a key step in rendering pipeline. It allows the integration of light arriving to a point...
We present a theoretical analysis of error of combinations of Monte Carlo estimators used in image s...
Modern physically based rendering techniques critically depend on approximating integrals of high di...
In computer graphics (especially in offline rendering), the current state of the art rendering techn...
In this document, we provide supplementary details on various topics discussed from the main paper. ...
Monte Carlo analysis has become nearly ubiquitous since its introduction, now over 65 years ago. It ...
We present novel samplers and algorithms for Monte Carlo rendering. The adaptive image-plane sampl...
Monte Carlo integration is often used for antialiasing in rendering processes. Due to low sampling ...
The numerical calculation of integrals is central to many computer graphics algorithms such as Monte...
Poisson disk sampling is one of the most important and widely employed sampling methods for imaging ...
The standard Monte Carlo approach to evaluating multi-dimensional integrals using (pseudo)-random in...
International audienceWe propose a new spectral analysis of the variance in Monte Carlo integration,...
International audienceFourier analysis is gaining popularity in image synthesis, as a tool for the a...
This dissertation introduces a theoretical framework to study different sampling patterns in the sph...
L’échantillonnage est une étape clé dans le rendu graphique. Il permet d’intégrer la lumière arrivan...
Sampling is a key step in rendering pipeline. It allows the integration of light arriving to a point...
We present a theoretical analysis of error of combinations of Monte Carlo estimators used in image s...
Modern physically based rendering techniques critically depend on approximating integrals of high di...
In computer graphics (especially in offline rendering), the current state of the art rendering techn...
In this document, we provide supplementary details on various topics discussed from the main paper. ...
Monte Carlo analysis has become nearly ubiquitous since its introduction, now over 65 years ago. It ...
We present novel samplers and algorithms for Monte Carlo rendering. The adaptive image-plane sampl...
Monte Carlo integration is often used for antialiasing in rendering processes. Due to low sampling ...
The numerical calculation of integrals is central to many computer graphics algorithms such as Monte...
Poisson disk sampling is one of the most important and widely employed sampling methods for imaging ...
The standard Monte Carlo approach to evaluating multi-dimensional integrals using (pseudo)-random in...