Subfactors associated to compact Kac algebras

If H is a Hopf algebra whose square of the antipode is the identity, v # L(V) H is a corepresentation, and ?: H Ä L(W) is a representation, then u=(id ?) v satisfies the equation (t id) u &1 =((t id) u) &1 of the vertex models for subfactors. A universal construction shows that any solution u of thi

We consider commuting squares of finite dimensional von Neumann algebras having the algebra of complex numbers in the lower left corner. Examples include the vertex models, the spin models (in the sense of subfactor theory), and the commuting squares associated to finite dimensional Kac algebras. To

Let M be a factor with separable predual and G a compact group of automorphisms of M whose action is minimal, i.e., M G$ & M=C, where M G denotes the G-fixed point subalgebra. Then every intermediate von Neumann algebra M G /N/M has the form N=M H for some closed subgroup H of G. An extension of thi

Weyl group. In this paper we construct polytopes P , P ; ‫ޒ‬ and a 1 2 linear map : ‫ޒ‬ lŽ . ª ᒅ\* such that for any dominant weight s k q k , we have Char E s e Ýe , where the sum is over all the integral points x, of the Ž . Ž . polytope k P q k P . Furthermore, we show that there exists a flat 1