On the law of the minimum of the solutions to a class of unidimensional SDEs
Abstract
We prove that the law of the minimum m:=t∈[0,1] (t) of the solution to a one-dimensional ODE with good nonlinearity has continuous density with respect to the Lebesgue measure. As a byproduct of the procedure, we show that the sets \ x∈ C([0,1]):\; x > r\ have finite perimeter with respect to the law of the solution (·) in L2(0,1).
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