In this paper, we study a noncoercive nonlinear elliptic operator with a drift term in an unbounded domain. The singular first-order term grows like |E(x)||∇u|, where E(x) is a vector… Click to show full abstract
In this paper, we study a noncoercive nonlinear elliptic operator with a drift term in an unbounded domain. The singular first-order term grows like |E(x)||∇u|, where E(x) is a vector field belonging to a suitable Morrey-type space. Our operator arises as a stationary equation of diffusion–advection problems. We prove existence, regularity, and uniqueness theorems for a Dirichlet problem. To obtain our main results, we use the weak maximum principle and the same a priori estimates.
Keywords:
nonlinear elliptic;
existence regularity;
noncoercive nonlinear;
uniqueness solutions;
regularity uniqueness
Journal Title: Mathematics
Year Published: 2024
Link to full text (if available)
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Journal Title: Mathematics
Year Published: 2024
Link to full text (if available)
Share on Social Media: Sign Up to like & get
recommendations!