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The first parameter makes the two-dimensional invariant manifolds of consecutive saddles in the cycle to pull apart; the second forces transverse intersection. The unfolding of each parameter is associated to the emergence of different dynamical scenarios (rank-one attractors and heteroclinic tangles). These relative positions may be determined using the Melnikov method.<\/p><p style='text-indent:20px;'>Extending the previous theory on the field, we prove the existence of many complicated dynamical objects in the two-parameter family, ranging from \"lar-ge\" strange attractors supporting SRB (Sinai-Ruelle-Bowen) measures to superstable sinks and non-uniformly hyperbolic attractors. We draw a plausible bifurcation diagram associated to the problem under consideration and we show that the occurrence of heteroclinic tangles is a <i>prevalent<\/i> phenomenon.<\/p><\/jats:p>","DOI":"10.3934\/cpaa.2022097","type":"journal-article","created":{"date-parts":[[2022,6,9]],"date-time":"2022-06-09T09:40:29Z","timestamp":1654767629000},"page":"3213","source":"Crossref","is-referenced-by-count":4,"title":["Rank-one strange attractors <i>versus<\/i> heteroclinic tangles"],"prefix":"10.3934","volume":"21","author":[{"given":"Alexandre A.","family":"Rodrigues","sequence":"first","affiliation":[{"name":"Center of Mathematics, University of Porto, Rua do Campo Alegre, 687, 4169-007 Porto, Portugal"},{"name":"Lisbon School of Economics & Management, University of Lisbon, Rua do Quelhas, 6, 1200-781 Lisbon, Portugal"}]}],"member":"2321","reference":[{"key":"key-10.3934\/cpaa.2022097-1","doi-asserted-by":"publisher","unstructured":"V. S. Afraimovich, S-B Hsu, H. E. 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