Derives a reconstruction formula to estimate division rate from size measurements in the incremental bacterial growth model and validates it numerically on simulated and experimental data.
Nonparametric density estimation from observations with multiplicative measurement errors
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abstract
In this paper we study the problem of pointwise density estimation from observations with multiplicative measurement errors. We elucidate the main feature of this problem: the influence of the estimation point on the estimation accuracy. In particular, we show that, depending on whether this point is separated away from zero or not, there are two different regimes in terms of the rates of convergence of the minimax risk. In both regimes we develop kernel--type density estimators and prove upper bounds on their maximal risk over suitable nonparametric classes of densities. We show that the proposed estimators are rate--optimal by establishing matching lower bounds on the minimax risk. Finally we test our estimation procedures on simulated data.
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math.ST 1years
2019 1verdicts
UNVERDICTED 1representative citing papers
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Estimating the division rate from indirect measurements of single cells
Derives a reconstruction formula to estimate division rate from size measurements in the incremental bacterial growth model and validates it numerically on simulated and experimental data.