Question on $\alpha-$Einstein manifolds

Question

A Riemannian manifold $(M,g)$ is called $\alpha-$Einstein if there exist a non-zero $1-$form $\alpha$ such $$\rho=ag+b\alpha\otimes\alpha$$ where $a,b$ are smooth functions on $M$ and $\rho$ is ricci tensor of $g$. It is easy to see that if $b=0$ then $(M,g)$ reduce to Einstein manifold.

Q1: Is there a similar version of the following known theorem such that we deduce $(M,g)$ is a $\alpha-$Einstein:

Theorem: Suppose $(M,g)$ is any Riemannian $n$-manifold with constant sectional curvature $C$. The curvature endomorphism, Ricci tensor, and scalar curvature of $g$ are given by the formulas $$R(X,Y)Z=C(g(Y,Z)X-g(X,Z)Y)$$ $$\rho=(n-1)Cg$$ $$r=n(n-1)C.$$

Q2: As you know Einstein metrics are fixed points of normalized ricci flow equation. Is there a PDE such as normalized ricci flow for $\alpha-$Einstein metrics?

Thanks.

Answer 1

For Q2 I found the following:

In Ricci solitons and real hypersurfaces in a complex space form Cho and Kimura studied on Ricci solitons of real hypersurfaces in a non-flat complex space form and they defined $\alpha-$Ricci soliton $(g,V,\lambda,\mu,\alpha)$, which satisfies the equation $$L_V g + 2S + \lambda g + 2\mu\alpha\otimes\alpha = 0,$$ where $\lambda$ and $\mu$ are real constants. In general, we can use this as generelization of $\alpha−$Einstein metric.