arXiv/ | markhubernews

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Designing Perfect Simulation Algorithms using Local Correctness

Mark Huber

arXiv:1907.06748

[arXiv]

Robust estimation of the mean with bounded relative standard deviation

Mark Huber

arXiv:1908.05386

[arXiv]

Halving the bounds for the Markov, Chebyshev, and Chernoff inequalities through smoothing

M. Huber

arXiv:1803.06361

[arXiv]

An optimal (ε,δ)-approximation scheme for the mean of random variables with bounded relative variance

M. Huber

arXiv:1706.01478

[arXiv]

The Fundamental Theorem of Perfect Simulation

M. Huber

arXiv:1704.03561

[arXiv]

Partially Recursive Acceptance Rejection

M. Huber

arXiv:1701.0821

[arXiv]

An estimator for Poisson means whose relative error distribution is known

M. Huber

arXiv:1605.09445

[arXiv]

Improving Monte Carlo randomized approximation schemes

M. Huber

arXiv:1411.4074

[arXiv]

Differential expression analysis for multiple conditions

C. Evans, J. Hardin, M. Huber, D. Stoebel, and G. Wong

arXiv:1410.3370

[arXiv]

Algebraic properties of Heilbronn's exponential sum: supercharacters, Fermat congruences, and Heath-Brown's bound

S. R. Garcia, M. Huber, and B. Lutz

arXiv:1312.1034

[arXiv]

a r X i v

Designing Perfect Simulation Algorithms using Local Correctness

Robust estimation of the mean with bounded relative standard deviation

Halving the bounds for the Markov, Chebyshev, and Chernoff inequalities through smoothing

An optimal (ε,δ)-approximation scheme for the mean of random variables with bounded relative variance

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The Fundamental Theorem of Perfect Simulation

Partially Recursive Acceptance Rejection

An estimator for Poisson means whose relative error distribution is known

Improving Monte Carlo randomized approximation schemes