Let $(M,g)$ be a complete non-compact manifold with bounded geometry, such that the Sobolev embeddings hold.
For the equation $$\Delta u=f,$$ for some $f\in L^2(M)$.
Q How can we find a solution $u\in L^2$ satisfies the above equation?
2026-03-25 10:53:08.1774435988
Laplacian equation on non-compact manifold
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