[{"citation":{"ama":"Ambrus Á, Csikós M, Kiss G, Pach J, Somlai G. Optimal embedded and enclosing isosceles triangles. International Journal of Foundations of Computer Science. 2023;34(7):737-760. doi:10.1142/S012905412342008X","apa":"Ambrus, Á., Csikós, M., Kiss, G., Pach, J., & Somlai, G. (2023). Optimal embedded and enclosing isosceles triangles. International Journal of Foundations of Computer Science. World Scientific Publishing. https://doi.org/10.1142/S012905412342008X","short":"Á. Ambrus, M. Csikós, G. Kiss, J. Pach, G. Somlai, International Journal of Foundations of Computer Science 34 (2023) 737–760.","mla":"Ambrus, Áron, et al. “Optimal Embedded and Enclosing Isosceles Triangles.” International Journal of Foundations of Computer Science, vol. 34, no. 7, World Scientific Publishing, 2023, pp. 737–60, doi:10.1142/S012905412342008X.","chicago":"Ambrus, Áron, Mónika Csikós, Gergely Kiss, János Pach, and Gábor Somlai. “Optimal Embedded and Enclosing Isosceles Triangles.” International Journal of Foundations of Computer Science. World Scientific Publishing, 2023. https://doi.org/10.1142/S012905412342008X.","ieee":"Á. Ambrus, M. Csikós, G. Kiss, J. Pach, and G. Somlai, “Optimal embedded and enclosing isosceles triangles,” International Journal of Foundations of Computer Science, vol. 34, no. 7. World Scientific Publishing, pp. 737–760, 2023.","ista":"Ambrus Á, Csikós M, Kiss G, Pach J, Somlai G. 2023. Optimal embedded and enclosing isosceles triangles. International Journal of Foundations of Computer Science. 34(7), 737–760."},"title":"Optimal embedded and enclosing isosceles triangles","day":"05","type":"journal_article","author":[{"last_name":"Ambrus","full_name":"Ambrus, Áron","first_name":"Áron"},{"last_name":"Csikós","first_name":"Mónika","full_name":"Csikós, Mónika"},{"last_name":"Kiss","first_name":"Gergely","full_name":"Kiss, Gergely"},{"last_name":"Pach","first_name":"János","full_name":"Pach, János","id":"E62E3130-B088-11EA-B919-BF823C25FEA4"},{"first_name":"Gábor","full_name":"Somlai, Gábor","last_name":"Somlai"}],"language":[{"iso":"eng"}],"doi":"10.1142/S012905412342008X","page":"737-760","month":"10","date_created":"2023-10-29T23:01:18Z","publisher":"World Scientific Publishing","isi":1,"quality_controlled":"1","department":[{"_id":"HeEd"}],"publication":"International Journal of Foundations of Computer Science","intvolume":" 34","status":"public","article_type":"original","year":"2023","oa_version":"Preprint","date_updated":"2023-12-13T13:04:55Z","user_id":"2DF688A6-F248-11E8-B48F-1D18A9856A87","scopus_import":"1","external_id":{"arxiv":["2205.11637"],"isi":["001080874400001"]},"publication_identifier":{"issn":["0129-0541"],"eissn":["1793-6373"]},"arxiv":1,"issue":"7","article_processing_charge":"No","date_published":"2023-10-05T00:00:00Z","_id":"14464","abstract":[{"lang":"eng","text":"Given a triangle Δ, we study the problem of determining the smallest enclosing and largest embedded isosceles triangles of Δ with respect to area and perimeter. This problem was initially posed by Nandakumar [17, 22] and was first studied by Kiss, Pach, and Somlai [13], who showed that if Δ′ is the smallest area isosceles triangle containing Δ, then Δ′ and Δ share a side and an angle. In the present paper, we prove that for any triangle Δ, every maximum area isosceles triangle embedded in Δ and every maximum perimeter isosceles triangle embedded in Δ shares a side and an angle with Δ. Somewhat surprisingly, the case of minimum perimeter enclosing triangles is different: there are infinite families of triangles Δ whose minimum perimeter isosceles containers do not share a side and an angle with Δ."}],"publication_status":"published","main_file_link":[{"url":"https://doi.org/10.48550/arXiv.2205.11637","open_access":"1"}],"oa":1,"volume":34}]