# The Continuum Limit of One-Dimensional Quantum Regge Calculus with   Massive Bosons

**Authors:** Takayuki Nakajima

arXiv: hep-lat/9602002 · 2008-02-03

## TL;DR

This paper investigates the continuum limit of one-dimensional quantum Regge calculus with massive bosons, focusing on defining the partition function and measure more realistically than previous simplified models.

## Contribution

It provides a more realistic analysis of the partition function and measure in one-dimensional quantum Regge calculus, addressing limitations of earlier simplified models.

## Key findings

- Confirmed the proposed form of the partition function in a more realistic setting
- Identified issues with previous simplified models
- Enhanced understanding of the continuum limit in quantum Regge calculus

## Abstract

The most essential problems in Regge calculus discretization are the definitions of the partition function and the integral measure for link--length. In recent work, by considering the one--dimensional case, it was suggested that we should define the partition function in a certain form. But in that work, the model which authors used was over simplified hence the conclusions may be unreliable. To confirm their claim, we consider a case that is more realistic.

## Full text

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## References

9 references — full list in the complete paper: https://tomesphere.com/paper/hep-lat/9602002/full.md

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Source: https://tomesphere.com/paper/hep-lat/9602002