Total algebras and weak independence. I

## Abstract It is shown that major independence conditions for left and right group operator algebras coincide. If Σ is a discrete ICC group, then the reduced left and right group algebras __W__^\*^~__λ__~(Σ) and __W__~__ϱ__~^\*^(Σ) are __W__^\*^‐independent. These algebras are moreover independent

We give an introduction to the theory of weak Hopf algebras proposed as a coassociati¨e alternative of weak quasi-Hopf algebras. We follow an axiomatic approach keeping as close as possible to the ''classical'' theory of Hopf algebras. The emphasis is put on the new structure related to the presence

If Ä ¿ ! is a cardinal, a complete Boolean algebra B is called Ä-dependent if for each sequence b ÿ : ÿ ¡ Ä of elements of B there exists a partition of the unity, P, such that each p ∈ P extends b ÿ or b ÿ , for Ä-many ÿ ∈ Ä. The connection of this property with cardinal functions, distributivity l