CDT is a modification of quantum
Regge calculus where spacetime is discretized by approximating it with a piecewise linear
manifold in a process called
triangulation. In this process, a
d-dimensional spacetime is considered as formed by space slices that are labeled by a discrete time variable
t. Each space slice is approximated by a
simplicial manifold composed by regular (
d − 1)-dimensional simplices and the connection between these slices is made by a piecewise linear manifold of
d-simplices. In place of a smooth manifold there is a network of triangulation nodes, where space is locally flat (within each simplex) but globally curved, as with the individual faces and the overall surface of a
geodesic dome. The line segments which make up each triangle can represent either a space-like or time-like extent, depending on whether they lie on a given time slice, or connect a vertex at time
t with one at time
t + 1. The crucial development is that the network of simplices is constrained to evolve in a way that preserves
causality. This allows a
path integral to be calculated
non-perturbatively, by summation of all possible (allowed) configurations of the simplices, and correspondingly, of all possible spatial geometries. Simply put, each individual simplex is like a building block of spacetime, but the edges that have a time arrow must agree in direction, wherever the edges are joined. This rule preserves causality, a feature missing from previous "triangulation" theories. When simplexes are joined in this way, the complex evolves in an orderly fashion, and eventually creates the observed framework of dimensions. CDT builds upon the earlier work of
John W. Barrett,
Louis Crane, and
John C. Baez, but by introducing the causality constraint as a fundamental rule (influencing the process from the very start), Loll, Ambjørn, and Jurkiewicz created something different. == Related theories ==