Semantic Numeration Systems as Dynamical Systems
This work addresses a foundational problem in semantic numeration systems theory, but it appears incremental as it builds on existing concepts without clear application or impact.
The paper tackles the problem of modeling semantic numeration systems by proposing to view cardinal abstract objects as linear discrete dynamical systems with nonlinear control, and provides state equations for both stationary and non-stationary cases under ideal observability.
The foundational concepts of semantic numeration systems theory are briefly outlined. The action of cardinal semantic operators unfolds over a set of cardinal abstract entities belonging to the cardinal semantic multeity. The cardinal abstract object (CAO) formed by them in a certain connectivity topology is proposed to be considered as a linear discrete dynamical system with nonlinear control. Under the assumption of ideal observability, the CAO state equations are provided for both stationary and non-stationary cases. The fundamental role of the configuration matrix, which combines information about the types of cardinal semantic operators in the CAO, their parameters and topology of connectivity, is demonstrated.