The ORA provides reproducible corneal biomechanical and IOP measurements in nonoperated eyes. Considering the effect of ORA, corneal biomechanical metrics produces an outcome-significant IOP adjustment in at least one quarter of glaucomatous and normal eyes undergoing noncontact tonometry. Corneal viscoelasticity (CH) and resistance (CRF) appear to decrease minimally with increasing age in healthy adults.
This work studies a simplified model of the gravitational instability of an
initially homogeneous infinite medium, represented by $\TT^d$, based on the
approximation that the mean fluid velocity is always proportional to the local
acceleration. It is shown that, mathematically, this assumption leads to the
restricted Patlak-Keller-Segel model considered by J\"ager and Luckhaus or,
equivalently, the Smoluchowski equation describing the motion of
self-gravitating Brownian particles, coupled to the modified Newtonian
potential that is appropriate for an infinite mass distribution. We discuss
some of the fundamental properties of a non-local generalization of this model
where the effective pressure force is given by a fractional Laplacian with
$0<\alpha<2$, and illustrate them by means of numerical simulations. Local
well-posedness in Sobolev spaces is proven, and we show the smoothing effect of
our equation, as well as a \emph{Beale-Kato-Majda}-type criterion in terms of
$\rhomax$. It is also shown that the problem is ill-posed in Sobolev spaces
when it is considered backward in time. Finally, we prove that, in the critical
case (one conservative and one dissipative derivative), $\rhomax(t)$ is
uniformly bounded in terms of the initial data for sufficiently large pressure
forces.Comment: Accepted in Physica D: Nonlinear Phenomen
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