{"work":{"id":"308c0a79-7c28-4d91-9b36-ea2dea6b6c2d","openalex_id":null,"doi":null,"arxiv_id":"cond-mat/0404051","raw_key":null,"title":"Kramers-Wannier duality from conformal defects","authors":null,"authors_text":"J","year":2004,"venue":"cond-mat.stat-mech","abstract":"We demonstrate that the fusion algebra of conformal defects of a two-dimensional conformal field theory contains information about the internal symmetries of the theory and allows one to read off generalisations of Kramers-Wannier duality. We illustrate the general mechanism in the examples of the Ising model and the three-states Potts model.","external_url":"https://arxiv.org/abs/cond-mat/0404051","cited_by_count":null,"metadata_source":"pith","metadata_fetched_at":"2026-05-24T09:58:23.036728+00:00","pith_arxiv_id":"cond-mat/0404051","created_at":"2026-05-11T07:50:59.277330+00:00","updated_at":"2026-06-05T21:23:00.469572+00:00","title_quality_ok":true,"display_title":"Kramers-Wannier duality from conformal defects","render_title":"Kramers-Wannier duality from conformal defects"},"hub":{"state":{"work_id":"308c0a79-7c28-4d91-9b36-ea2dea6b6c2d","tier":"hub","tier_reason":"10+ Pith inbound or 1,000+ external citations","pith_inbound_count":20,"external_cited_by_count":null,"distinct_field_count":2,"first_pith_cited_at":"2021-11-01T18:00:00+00:00","last_pith_cited_at":"2026-05-15T17:07:08+00:00","author_build_status":"not_needed","summary_status":"needed","contexts_status":"needed","graph_status":"needed","ask_index_status":"not_needed","reader_status":"not_needed","recognition_status":"not_needed","updated_at":"2026-06-05T22:09:38.809746+00:00","tier_text":"hub"},"tier":"hub","role_counts":[{"context_role":"background","n":11}],"polarity_counts":[{"context_polarity":"background","n":11}],"runs":{},"summary":{},"graph":{},"authors":[]}}