140 research outputs found
Counterexamples to regularities for the derivative processes associated to stochastic evolution equations
In the recent years there has been an increased interest in studying
regularity properties of the derivatives of stochastic evolution equations
(SEEs) with respect to their initial values. In particular, in the scientific
literature it has been shown for every natural number that if
the nonlinear drift coefficient and the nonlinear diffusion coefficient of the
considered SEE are -times continuously Fr\'{e}chet differentiable, then the
solution of the considered SEE is also -times continuously Fr\'{e}chet
differentiable with respect to its initial value and the corresponding
derivative processes satisfy a suitable regularity property in the sense that
the -th derivative process can be extended continuously to -linear
operators on negative Sobolev-type spaces with regularity parameters
provided that the condition is satisfied. The main contribution of this paper
is to reveal that this condition can essentially not be relaxed
Existence, uniqueness, and regularity for stochastic evolution equations with irregular initial values
In this article we develop a framework for studying parabolic semilinear
stochastic evolution equations (SEEs) with singularities in the initial
condition and singularities at the initial time of the time-dependent
coefficients of the considered SEE. We use this framework to establish
existence, uniqueness, and regularity results for mild solutions of parabolic
semilinear SEEs with singularities at the initial time. We also provide several
counterexample SEEs that illustrate the optimality of our results
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