International audienceFourier analysis is gaining popularity in image synthesis, as a tool for the analysis of error in Monte Carlo (MC) integration. Still, existing tools are only able to analyze convergence under simplifying assumptions (such as randomized shifts) which are not applied in practice during rendering. We reformulate the expressions for bias and variance of sampling-based integrators to unify non-uniform sample distributions (importance sampling) as well as correlations between samples while respecting finite sampling domains. Our unified formulation hints at fundamental limitations of Fourier-based tools in performing variance analysis for MC integration. This non-trivial exercise also provides exciting insight into the effe...
Traditional Monte Carlo (MC) integration methods use point samples to numerically approximate the un...
L’échantillonnage est une étape clé dans le rendu graphique. Il permet d’intégrer la lumière arrivan...
The application of Monte Carlo (MC) to large-scale fixed-source problems has recently become possibl...
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...
Multiple importance sampling (MIS) has become an indispensable tool in Monte Carlo rendering, widely...
International audienceMonte Carlo integration is firmly established as the basis for most practical ...
This thesis is concerned with Monte Carlo importance sampling as used for statistical multiple integ...
Monte Carlo importance sampling for evaluating numerical integration is discussed. We consider a par...
Sampling is a key step in rendering pipeline. It allows the integration of light arriving to a point...
International audienceWe propose a new spectral analysis of the variance in Monte Carlo integration,...
This dissertation introduces a theoretical framework to study different sampling patterns in the sph...
The complexity of integrands in modern scientific, industrial and financial problems increases rapid...
Importance sampling is a well known variance reduction technique for Monte Carlo simulation. For qua...
We present novel samplers and algorithms for Monte Carlo rendering. The adaptive image-plane sampl...
Traditional Monte Carlo (MC) integration methods use point samples to numerically approximate the un...
L’échantillonnage est une étape clé dans le rendu graphique. Il permet d’intégrer la lumière arrivan...
The application of Monte Carlo (MC) to large-scale fixed-source problems has recently become possibl...
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...
Multiple importance sampling (MIS) has become an indispensable tool in Monte Carlo rendering, widely...
International audienceMonte Carlo integration is firmly established as the basis for most practical ...
This thesis is concerned with Monte Carlo importance sampling as used for statistical multiple integ...
Monte Carlo importance sampling for evaluating numerical integration is discussed. We consider a par...
Sampling is a key step in rendering pipeline. It allows the integration of light arriving to a point...
International audienceWe propose a new spectral analysis of the variance in Monte Carlo integration,...
This dissertation introduces a theoretical framework to study different sampling patterns in the sph...
The complexity of integrands in modern scientific, industrial and financial problems increases rapid...
Importance sampling is a well known variance reduction technique for Monte Carlo simulation. For qua...
We present novel samplers and algorithms for Monte Carlo rendering. The adaptive image-plane sampl...
Traditional Monte Carlo (MC) integration methods use point samples to numerically approximate the un...
L’échantillonnage est une étape clé dans le rendu graphique. Il permet d’intégrer la lumière arrivan...
The application of Monte Carlo (MC) to large-scale fixed-source problems has recently become possibl...