A notion of the weighted σ_k-curvature for manifolds with density

We propose a natural definition of the weighted $\sigma_k$-curvature for a manifold with density; i.e.\ a triple $(M^n,g,e^{-\phi}\mathrm{dvol})$. This definition is intended to capture the key properties of the $\sigma_k$-curvatures in conformal geometry with the role of pointwise conformal changes of the metric replaced by pointwise changes of the measure. We justify our definition through three main results. First, we show that shrinking gradient Ricci solitons are local extrema of the total weighted $\sigma_k$-curvature functionals when the weighted $\sigma_k$-curvature is variational. Second, we characterize the shrinking Gaussians as measures on Euclidean space in terms of the total weighted $\sigma_k$-curvature functionals. Third, we characterize when the weighted $\sigma_k$-curvature is variational. These results are all analogues of their conformal counterparts, and in the case $k=1$ recover some of the well-known properties of Perelman's $\mathcal{W}$-functional.