The objective of this paper is twofold. First we provide the -- to the best knowledge of the authors -- first result on the behavior of the regular part of the free boundary of the obstacle problem close to singularities. We do this using our second result which is the partial answer to a long standing conjecture and the first partial classification of global solutions of the obstacle problem with unbounded coincidence sets.
We consider the 1D transport equation with nonlocal velocity field: begin{equation*}label{intro eq} begin{split} &theta_t+utheta_x+ u Lambda^{gamma}theta=0, & u=mathcal{N}(theta), end{split} end{equation*} where $mathcal{N}$ is a nonlocal operator.
In this paper, we show the existence of solutions of this model locally and globally in time for various types of nonlocal operators.
We introduce a systematic method to solve a type of Cartans realization problem. Our method builds upon a new theory of Lie algebroids and Lie groupoids with structure group and connection. This approach allows to find local as well as complete solut
ions, their symmetries, and to determine the moduli spaces of local and complete solutions. We apply our method to the problem of classification of extremal Kahler metrics on surfaces.
We provide sufficient conditions on the coefficients of a stochastic evolution equation on a Hilbert space of functions driven by a cylindrical Wiener process ensuring that its mild solution is positive if the initial datum is positive. As an applica
tion, we discuss the positivity of forward rates in the Heath-Jarrow-Morton model via Musielas stochastic PDE.
In this paper the global existence of weak solutions to the relativistic BGK model for the relativistic Boltzmann equation is analyzed. The proof relies on the strong compactness of the density, velocity and temperature under minimal assumptions on t
he control of some moments of the initial condition together with the initial entropy.
For the thin obstacle problem in 3d, we show that half-space solutions form an isolated family in the space of $7/2$-homogeneous solutions. For a general solution with one blow-up profile in this family, we establish the rate of convergence to this p
rofile. As a consequence, we obtain regularity of the free boundary near such contact points.
Simon Eberle
,Henrik Shahgholian
,Georg S. Weiss
.
(2020)
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"On global solutions of the obstacle problem -- application to the local analysis close to singularities"
.
Simon Eberle
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