In this paper we study a Dirichlet problem relative to the equation Lu = g phi - (f_i phi)(x_i), where L is a linear elliptic operator with lower-order terms whose ellipticity condition is given in terms of the function phi(x), the density of the Gaussian measure. We use the notion of rearrangement with respect to the Gauss measure to obtain a priori estimate of the solution u and we study the summability of u in the Lorentz-Zygmund spaces when g and f_i vary in suitable Lorent-Zygmund spaces.
Regularity results for degenerate elliptic equations related to Gauss measure
FEO, Filomena;
2007-01-01
Abstract
In this paper we study a Dirichlet problem relative to the equation Lu = g phi - (f_i phi)(x_i), where L is a linear elliptic operator with lower-order terms whose ellipticity condition is given in terms of the function phi(x), the density of the Gaussian measure. We use the notion of rearrangement with respect to the Gauss measure to obtain a priori estimate of the solution u and we study the summability of u in the Lorentz-Zygmund spaces when g and f_i vary in suitable Lorent-Zygmund spaces.File in questo prodotto:
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