[{"publisher":"Taylor & Francis ","quality_controlled":"1","status":"public","language":[{"iso":"eng"}],"author":[{"full_name":"Lampe, Philipp","id":"23121883","last_name":"Lampe","first_name":"Philipp"}],"year":"2018","title":"On the Approximate Periodicity of Sequences Attached to Non-Crystallographic Root Systems","volume":27,"issue":"3","citation":{"default":"Lampe P (2018)

*EXPERIMENTAL MATHEMATICS* 27(3): 265-271.","mla":"Lampe, Philipp. “On the Approximate Periodicity of Sequences Attached to Non-Crystallographic Root Systems”. *EXPERIMENTAL MATHEMATICS* 27.3 (2018): 265-271.","dgps":"Lampe, P. (2018). On the Approximate Periodicity of Sequences Attached to Non-Crystallographic Root Systems. *EXPERIMENTAL MATHEMATICS*, *27*(3), 265-271. Taylor & Francis . doi:10.1080/10586458.2016.1255861.

","bio1":"Lampe P (2018)

On the Approximate Periodicity of Sequences Attached to Non-Crystallographic Root Systems.

EXPERIMENTAL MATHEMATICS 27(3): 265-271.","ama":"Lampe P. On the Approximate Periodicity of Sequences Attached to Non-Crystallographic Root Systems. *EXPERIMENTAL MATHEMATICS*. 2018;27(3):265-271.","apa_indent":"Lampe, P. (2018). On the Approximate Periodicity of Sequences Attached to Non-Crystallographic Root Systems. *EXPERIMENTAL MATHEMATICS*, *27*(3), 265-271. doi:10.1080/10586458.2016.1255861

","ieee":" P. Lampe, “On the Approximate Periodicity of Sequences Attached to Non-Crystallographic Root Systems”, *EXPERIMENTAL MATHEMATICS*, vol. 27, 2018, pp. 265-271.","chicago":"Lampe, Philipp. 2018. “On the Approximate Periodicity of Sequences Attached to Non-Crystallographic Root Systems”. *EXPERIMENTAL MATHEMATICS* 27 (3): 265-271.

","frontiers":"Lampe, P. (2018). On the Approximate Periodicity of Sequences Attached to Non-Crystallographic Root Systems. *EXPERIMENTAL MATHEMATICS* 27, 265-271.","lncs":" Lampe, P.: On the Approximate Periodicity of Sequences Attached to Non-Crystallographic Root Systems. EXPERIMENTAL MATHEMATICS. 27, 265-271 (2018).","apa":"Lampe, P. (2018). On the Approximate Periodicity of Sequences Attached to Non-Crystallographic Root Systems. *EXPERIMENTAL MATHEMATICS*, *27*(3), 265-271. doi:10.1080/10586458.2016.1255861","angewandte-chemie":"P. Lampe, “On the Approximate Periodicity of Sequences Attached to Non-Crystallographic Root Systems”, *EXPERIMENTAL MATHEMATICS*, **2018**, *27*, 265-271.","harvard1":"Lampe, P., 2018. On the Approximate Periodicity of Sequences Attached to Non-Crystallographic Root Systems. *EXPERIMENTAL MATHEMATICS*, 27(3), p 265-271.","wels":"Lampe, P. (2018): On the Approximate Periodicity of Sequences Attached to Non-Crystallographic Root Systems *EXPERIMENTAL MATHEMATICS*,27:(3): 265-271."},"article_type":"original","department":[{"_id":"10020"}],"publication":"EXPERIMENTAL MATHEMATICS","doi":"10.1080/10586458.2016.1255861","user_id":"89573","date_created":"2018-12-18T15:09:34Z","publication_identifier":{"eissn":["1944-950X"],"issn":["1058-6458"]},"type":"journal_article","isi":1,"external_id":{"isi":["000452040100002"]},"page":"265-271","date_updated":"2018-12-19T15:35:48Z","publication_status":"published","abstract":[{"text":"We study Fomin-Zelevinsky's mutation rule in the context of non-crystallographic root systems. In particular, we construct approximately periodic sequences of real numbers for the non-crystallographic root systems of rank 2 by adjusting the exchange relation for cluster algebras. Moreover, we describe matrix mutation classes for types H-3 and H-4.","lang":"eng"}],"_id":"2932805","keyword":["cluster algebra","non-crystallographic root system","approximate","periodicity"],"intvolume":" 27"}]