The first aim of this note is to describe an algebraic structure,
more primitive than lattices and quantales, which corresponds to the
intuitionistic flavour of Linear Logic we prefer. This part of the note
is a total trivialisation of ideas from category theory and we play with
a toy-structure a not distant cousin of a toy-language.
The second goal of the note is to show a generic categorical construction,
which builds models for Linear Logic, similar to categorical models GC of
[deP1990], but more general. The ultimate aim is to relate different categorical models of linear logic
