928 research outputs found
Oblique derivative problem for non-divergence parabolic equations with discontinuous in time coefficients in a wedge
We consider an oblique derivative problem in a wedge for nondivergence
parabolic equations with discontinuous in coefficients. We obtain weighted
coercive estimates of solutions in anisotropic Sobolev spaces.Comment: 26 page
Hadamard Type Asymptotics for Eigenvalues of the Neumann Problem for Elliptic Operators
This paper considers how the eigenvalues of the Neumann problem for an
elliptic operator depend on the domain. The proximity of two domains is
measured in terms of the norm of the difference between the two resolvents
corresponding to the reference domain and the perturbed domain, and the size of
eigenfunctions outside the intersection of the two domains. This construction
enables the possibility of comparing both nonsmooth domains and domains with
different topology. An abstract framework is presented, where the main result
is an asymptotic formula where the remainder is expressed in terms of the
proximity quantity described above when this is relatively small. We consider
two applications: the Laplacian in both and Lipschitz domains.
For the case, an asymptotic result for the eigenvalues is given
together with estimates for the remainder, and we also provide an example which
demonstrates the sharpness of our obtained result. For the Lipschitz case, the
proximity of eigenvalues is estimated
A comparison theorem for nonsmooth nonlinear operators
We prove a comparison theorem for super- and sub-solutions with non-vanishing
gradients to semilinear PDEs provided a nonlinearity is function with
. The proof is based on a strong maximum principle for solutions of
divergence type elliptic equations with VMO leading coefficients and with lower
order coefficients from a Kato class. An application to estimation of periodic
water waves profiles is given.Comment: 12 page
N-modal steady water waves with vorticity
The problem for two-dimensional steady gravity driven water waves with
vorticity is investigated. Using a multidimensional bifurcation argument, we
prove the existence of small-amplitude periodic steady waves with an arbitrary
number of crests per period. The role of bifurcation parameters is played by
the roots of the dispersion equation
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