In this paper we have used simulations to make a conjecture about the coverage of a t-dimensional subspace of a d-dimensional parameter space of size n when performing k trials of Latin Hypercube sampling. This takes the form P(k,n,d,t) = 1 - e^(-k/n^(t-1)). We suggest that this coverage formula is independent of d and this allows us to make connections between building Populations of Models and Experimental Designs. We also show that Orthogonal sampling is superior to Latin Hypercube sampling in terms of allowing a more uniform coverage of the t-dimensional subspace at the sub-block size level. These ideas have particular relevance when attempting to perform uncertainty quantification and sensitivity analyses
Latin hypercube designs with zero pair-wise column correlations are examined for their space-filling...
Latin hypercube designs with zero pair-wise column correlations are examined for their space-filling...
The Latin Hypercube Sampling, LHS, plan was presented by McKay, Beckman and Conover (Technometrics, ...
In this paper we have used simulations to make a conjecture about the coverage of a t-dimensional su...
AbstractIn this paper we have used simulations to make a conjecture about the coverage of a t dimens...
In this paper we use counting arguments to prove that the expected percentage coverage of a d dimens...
In this paper we provide estimates for the coverage of parameter space when using Latin Hypercube Sa...
International audienceWe analyze an extended form of Latin hypercube sampling technique that can be ...
McKay, Conover and Beckman (1979) introduced Latin hypercube sampling (LHS) for reducing variance of...
Abstract: In this article, a novel method for the exten-sion of sample size in Latin Hypercube Sampl...
McKay, Conover and Beckman (1979) introduced Latin hypercube sampling (LHS) for reducing variance of...
<p>(a) One realization of twenty samples drawn randomly in a two dimensional parameter space is show...
Monte Carlo analysis has become nearly ubiquitous since its introduction, now over 65 years ago. It ...
Three sampling methods are compared for efficiency on a number of test problems of various complexit...
Orthogonal array based Latin hypercube sampling (LHS) is popularly adopted for computer experiments....
Latin hypercube designs with zero pair-wise column correlations are examined for their space-filling...
Latin hypercube designs with zero pair-wise column correlations are examined for their space-filling...
The Latin Hypercube Sampling, LHS, plan was presented by McKay, Beckman and Conover (Technometrics, ...
In this paper we have used simulations to make a conjecture about the coverage of a t-dimensional su...
AbstractIn this paper we have used simulations to make a conjecture about the coverage of a t dimens...
In this paper we use counting arguments to prove that the expected percentage coverage of a d dimens...
In this paper we provide estimates for the coverage of parameter space when using Latin Hypercube Sa...
International audienceWe analyze an extended form of Latin hypercube sampling technique that can be ...
McKay, Conover and Beckman (1979) introduced Latin hypercube sampling (LHS) for reducing variance of...
Abstract: In this article, a novel method for the exten-sion of sample size in Latin Hypercube Sampl...
McKay, Conover and Beckman (1979) introduced Latin hypercube sampling (LHS) for reducing variance of...
<p>(a) One realization of twenty samples drawn randomly in a two dimensional parameter space is show...
Monte Carlo analysis has become nearly ubiquitous since its introduction, now over 65 years ago. It ...
Three sampling methods are compared for efficiency on a number of test problems of various complexit...
Orthogonal array based Latin hypercube sampling (LHS) is popularly adopted for computer experiments....
Latin hypercube designs with zero pair-wise column correlations are examined for their space-filling...
Latin hypercube designs with zero pair-wise column correlations are examined for their space-filling...
The Latin Hypercube Sampling, LHS, plan was presented by McKay, Beckman and Conover (Technometrics, ...