Rotating Killing horizons in generic F(R) gravity theories

We discuss various properties of rotating Killing horizons in generic F(R) theories of gravity in dimension four for spacetimes endowed with two commuting Killing vector fields. Assuming there is no curvature singularity anywhere on or outside the horizon, we construct a suitable (3 + 1)-foliation. We show that similar to Einstein's gravity, we must have T(ab)k(a)k(b) = 0 on the Killing horizon, where k(a) is a null geodesic tangent to the horizon. For axisymmetric spacetimes, the effective gravitational coupling similar to F'-1(R) should usually depend upon the polar coordinate and hence need not necessarily be a constant on the Killing horizon. We prove that the surface gravity of such a Killing horizon must be a constant, irrespective of whether F' (R) is a constant there or not. We next apply these results to investigate some further basic features. In particular, we show that any hairy solution for the real massive vector field in such theories is clearly ruled out, as long as the potential of the scalar field generated in the corresponding Einstein's frame is a positive definite quantity.