A duality of fields
Abstract
It is shown that there exists a duality among fields. If a field is dual to another field, the solution of the field can be obtained from the dual field by the duality transformation. We give a general result on the dual fields. Different fields may have different numbers of dual fields, e.g., the free field and the -field are self-dual, the -field has one dual field, a field with an -term polynomial potential has dual fields, and a field with a nonpolynomial potential may have infinite number of dual fields. All fields which are dual to each other form a duality family. This implies that the field can be classified in the sense of duality, or, the duality family defines a duality class. Based on the duality relation, we can construct a high-efficiency approach for seeking the solution of field equations: solving one field in the duality family, all solutions of other fields in the family are obtained immediately by the duality transformation. As examples, we consider some -fields, general polynomial-potential fields, and the sine-Gordon field.
Cite
@article{arxiv.1905.06805,
title = {A duality of fields},
author = {Wen-Du Li and Wu-Sheng Dai},
journal= {arXiv preprint arXiv:1905.06805},
year = {2019}
}