English

Mobility spaces and their geodesic paths

General Mathematics 2020-01-13 v1

Abstract

We introduce an algebraic system which can be used as a model for spaces with geodesic paths between any two of their points. This new algebraic structure is based on the notion of mobility algebra which has recently been introduced as a model for the unit interval of real numbers. Mobility algebras consist on a set AA together with three constants and a ternary operation. In the case of the closed unit interval A=[0,1]A=[0,1], the three constants are 0, 1 and 1/2 while the ternary operation is p(x,y,z)=xyx+yzp(x,y,z)=x-yx+yz. A mobility space is a set XX together with a map q ⁣:X×A×XXq\colon{X\times A\times X\to X} with the meaning that q(x,t,y)q(x,t,y) indicates the position of a particle moving from point xx to point yy at the instant tAt\in A, along a geodesic path within the space XX. A mobility space is thus defined with respect to a mobility algebra, in the same way as a module is defined over a ring. We introduce the axioms for mobility spaces, investigate the main properties and give examples. We also establish the connection between the algebraic context and the one of spaces with geodesic paths. The connection with affine spaces is briefly mentioned.

Keywords

Cite

@article{arxiv.2001.03441,
  title  = {Mobility spaces and their geodesic paths},
  author = {J. P. Fatelo and N. Martins-Ferreira},
  journal= {arXiv preprint arXiv:2001.03441},
  year   = {2020}
}

Comments

27 pages

R2 v1 2026-06-23T13:07:57.099Z