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Main Authors: Ferdinand, Léonard, Gurau, Razvan, Perez-Sanchez, Carlos I., Vignes-Tourneret, Fabien
Format: Preprint
Published: 2022
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Online Access:https://arxiv.org/abs/2209.09045
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author Ferdinand, Léonard
Gurau, Razvan
Perez-Sanchez, Carlos I.
Vignes-Tourneret, Fabien
author_facet Ferdinand, Léonard
Gurau, Razvan
Perez-Sanchez, Carlos I.
Vignes-Tourneret, Fabien
contents We consider a quartic O(N)-vector model. Using the Loop Vertex Expansion, we prove the Borel summability in 1/N along the real axis of the partition function and of the connected correlations of the model. The Borel summability holds uniformly in the coupling constant, as long as the latter belongs to a cardioid like domain of the complex plane, avoiding the negative real axis.
format Preprint
id arxiv_https___arxiv_org_abs_2209_09045
institution arXiv
publishDate 2022
record_format arxiv
spellingShingle Borel summability of the 1/N expansion in quartic O(N)-vector models
Ferdinand, Léonard
Gurau, Razvan
Perez-Sanchez, Carlos I.
Vignes-Tourneret, Fabien
Mathematical Physics
We consider a quartic O(N)-vector model. Using the Loop Vertex Expansion, we prove the Borel summability in 1/N along the real axis of the partition function and of the connected correlations of the model. The Borel summability holds uniformly in the coupling constant, as long as the latter belongs to a cardioid like domain of the complex plane, avoiding the negative real axis.
title Borel summability of the 1/N expansion in quartic O(N)-vector models
topic Mathematical Physics
url https://arxiv.org/abs/2209.09045