English

Computability of finite simplicial complexes

Logic 2022-02-11 v1 Algebraic Topology General Topology

Abstract

The topological properties of a set have a strong impact on its computability properties. A striking illustration of this idea is given by spheres and closed manifolds: if a set XX is homeomorphic to a sphere or a closed manifold, then any algorithm that semicomputes XX in some sense can be converted into an algorithm that fully computes XX. In other words, the topological properties of XX enable one to derive full information about XX from partial information about XX. In that case, we say that XX has computable type. Those results have been obtained by Miller, Iljazovi\'c, Su\v{s}i\'c and others in the recent years. A similar notion of computable type was also defined for pairs (X,A)(X,A) in order to cover more spaces, such as compact manifolds with boundary and finite graphs with endpoints. We investigate the higher dimensional analog of graphs, namely the pairs (X,A)(X,A) where XX is a finite simplicial complex and AA is a subcomplex of XX. We give two topological characterizations of the pairs having computable type. The first one uses a global property of the pair, that we call the ϵ\epsilon-surjection property. The second one uses a local property of neighborhoods of vertices, called the surjection property. We give a further characterization for 22-dimensional simplicial complexes, by identifying which local neighborhoods have the surjection property. Using these characterizations, we give non-trivial applications to two famous sets: we prove that the dunce hat does not have computable type whereas Bing's house does. Important concepts from topology, such as absolute neighborhood retracts and topological cones, play a key role in our proofs.

Keywords

Cite

@article{arxiv.2202.04945,
  title  = {Computability of finite simplicial complexes},
  author = {Djamel Eddine Amir and Mathieu Hoyrup},
  journal= {arXiv preprint arXiv:2202.04945},
  year   = {2022}
}
R2 v1 2026-06-24T09:29:48.177Z