Absence of Lp spectrum for asymptotically flat diffusions in region with cavities
Abstract
We study solutions to variable-coefficient elliptic equations of the form -(A(x) ∇ u) = u, >0, in an exterior domain ⊂ , where A(x) is uniformly elliptic and asymptotically flat. Extending Rellich's classical L2 result for the Laplacian, we show that if u∈ Lp() for some 0<p<2nn-1, then u 0. The proof uses new monotonicity formulas based on weighted energies and vector fields adapted to the geometry of A(x). Our results highlight a sharper integrability threshold in the variable-coefficient setting.
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