Weighted GJMS operators on smooth metric measure spaces

Abstract: We construct weighted GJMS operators on smooth metric measure spaces, and prove that they are formally self-adjoint. We also provide factorization formulas for them in the case of quasi-Einstein spaces and under Gover-Leitner conditions.

“…After this paper was finished, it was brought to our attention that many more relevant weighted invariants are constructed through the recent work of Khaitan [22,23]. In light of the results of the σ 2 -invariant and renormalized volume coefficients in closed Riemannian manifolds, we expect that results similar to ours also hold for the invariant constructed by Khaitan (cf.…”

Deformation of the Weighted Scalar Curvature

“…After this paper was finished, it was brought to our attention that many more relevant weighted invariants are constructed through the recent work of Khaitan [22,23]. In light of the results of the σ 2 -invariant and renormalized volume coefficients in closed Riemannian manifolds, we expect that results similar to ours also hold for the invariant constructed by Khaitan (cf.…”

Deformation of the Weighted Scalar Curvature

“…In a separate article [21], Khaitan used Theorems 1.1, 1.2 and 1.3 to give a rigorous construction of the weighted GJMS operators of all orders up to the obstruction, and to prove that they are formally self-adjoint. He also gave explicit formulas for the weighted GJMS operators for smooth metric measure spaces satisfying the first or last conditions of Theorem 1.2.…”

The Weighted Ambient Metric