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We introduce a new algorithm for the simulation of Euclidean dynamical
triangulations that mimics the Metropolis-Hastings algorithm, but where all
proposed moves are accepted. This rejection-free algorithm allows for the
factorization of local and global terms in the action, a condition needed for
efficient simulation of theories with global terms, while still maintaining
detailed balance. We test our algorithm on the $2d$ Ising model, and against
results for EDT obtained with standard Metropolis. Our new algorithm allows us
to simulate EDT at finer lattice spacings than previously possible, and we find
geometries that resemble semiclassical Euclidean de Sitter space in agreement
with earlier results at coarser lattices. The agreement between lattice data
and the classical de Sitter solution continues to get better as the lattice
spacing decreases.
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