We use Greechie diagrams to construct finite orthomodular la ttices ‘realizable’ in the orthomodular lattice of subspaces in a threed im nsional Hilbert space such that the set of two-valued states… (More)

The fixation probability is the probability that a new mutant introduced in a homogeneous population eventually takes over the entire population. The fixation probability is a fundamental quantity of… (More)

There are various possibilities how to represent orthomodular structures. One attempt (topological) follows the famous Stone construction for representation of Boolean algebras and leads to a… (More)

The trivalent functions of a trit can be grouped into equipartitions of three elements. We discuss the separation of the corresponding functional classes by quantum state identifications.

This paper deals with the multiple-rule problem which arises when several decision rules (of different classes) match (“fire” for) an input to-be-classified (unseen) object. The paper focuses on… (More)

We consider the modified Moran process on graphs to study the spread of genetic and cultural mutations on structured populations. An initial mutant arises either spontaneously (aka uniform… (More)

We show that a commutative bounded integral orthomodular lattice is residuated iff it is a Boolean algebra. This result is a consequence of [7, Theorem 7.31]; however, our proof is independent and… (More)