Invariants in Quantum Geometry

Abstract

In quantum geometry, we consider a set of loops, a compact orientable surface and a solid compact spatial region, all inside R × R3 R4, which forms a triple. We want to define an ambient isotopic equivalence relation on such triples, so that we can obtain equivalence invariants. These invariants describe how these submanifolds are causally related to or `linked' with each other, and they are closely associated with the linking number between links in R3. Because we distinguish the time-axis from spatial subspace in R4, we see that these equivalence relations, will also imply causality.