$\kappa$-Suslin Hypothesis ($\kappa$-SH) for the infinite regular cardinal $\kappa$ says that every tree of height $\kappa$ either has a branch of length $\kappa$ or an antichain of cardinality $\kappa$ (i.e. there is no $\kappa$-Suslin tree).
Example: It is known that GCH+$\omega_2$-SH implies that $\omega_2$ is Mahlo in $L$.
Question: What are other known large cardinal consequences of $\kappa$-SH for different regular cardinals $\kappa$?