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    Estimating the Division Kernel of a Size-Structured Population

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    We consider a size-structured population describing the cell divisions. The cell population is described by an empirical measure and we observe the divisions in the continuous time interval [0, T ]. We address here the problem of estimating the division kernel h (or fragmentation kernel) in case of complete data. An adaptive estimator of h is constructed based on a kernel function K with a fully data-driven bandwidth selection method. We obtain an oracle inequality and an exponential convergence rate, for which optimality is considered

    A local proof of the dimensional Pr\'ekopa's theorem

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    The aim of this paper is to find an expression for second derivative of the function ϕ(t)\phi(t) defined by \phi(t) = \lt(\int_V \vphi(t,x)^{-\beta} dx\rt)^{-\frac1{\be -n}},\qquad \beta\not= n, where U⊂RU\subset \R and V⊂RnV\subset \R^n are open bounded subsets, and \vphi: U\times V\to \R_+ is a C2−C^2-smooth function. As a consequence, this result gives us a direct proof of the dimensional Pr\'ekopa's theorem based on a local approach.Comment: 9 pages, to appear in J. Math. Anal. App
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