In this paper we investigate the endomorphism algebras of standard cluster
tilting objects in the stably 2-Calabi-Yau categories $\Sub{\Lambda_w}$ with
elements $w$ in Coxeter groups in \cite{BIRSc}. They are examples of the
2-Auslander algebras introduced in \cite{I1}. Generalizing work in \cite{GLS1}
we show that they are quasihereditary, even strongly quasihereditary in the
sense of \cite{R}.

We prove the periodicities of the restricted T and Y-systems associated with
the quantum affine algebra of type B_r at any level. We also prove the
dilogarithm identities for the Y-systems of type B_r at any level. Our proof is
based on the tropical Y-systems and the categorification of the cluster algebra
associated with any skew-symmetric matrix by Plamondon. Using this new method,
we also give an alternative and simplified proof of the periodicities of the T
and Y-systems associated with pairs of simply laced Dynkin diagrams.

We introduce the notion of n-representation-finiteness, generalizing
representation-finite hereditary algebras. We establish the procedure of n-APR
tilting, and show that it preserves n-representation-finiteness. We give some
combinatorial description of this procedure, and use this to completely
describe a class of n-representation-finite algebras called ``type A''.