What is known about the absoluteness, or lack thereof, of the notion of "$\kappa$-homogeneously Suslin" for sets of reals?
For example, if $A$ is $\kappa$-homogeneously Suslin and $\lambda > \kappa$ is inaccessible, does $V_\lambda \vDash {}$"$A$ is $\kappa$-homogeneously Suslin"?
The corresponding absoluteness is true for "$\kappa$-universally Baire," so if there are some Woodin cardinals around $\kappa$ then one can prove an approximation to this absoluteness for "$\kappa$-homogeneously Suslin." But such an argument made me wonder if some absoluteness property for "$\kappa$-homogeneously Suslin" might be provable outright.
