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Minuscule analogues of the plane partition periodicity conjecture of Cameron and Fon-Der-Flaass
Abstract: Let P be a graded poset of rank r and let c be a c-element chain. For an order ideal I of P × c, its rowmotion ψ(I) is the smallest ideal containing the minimal elements of the complementary filter of I. The map ψ defines invertible dynamics on the set of ideals. We say that P has NRP ('not relatively prime') rowmotion if no ψ-orbit has cardinality relatively prime to r + c + 1.In work with R. Patrias (2020), we proved a 1995 conjecture of P. Cameron and D. Fon-Der-Flaass by establishing NRP rowmotion for the …
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“…In the literature these tableaux are sometimes called (just) increasing tableaux or packed increasing tableaux[Pe2]. …”
mentioning
confidence: 99%
“…In the literature these tableaux are sometimes called (just) increasing tableaux or packed increasing tableaux[Pe2]. …”
mentioning
confidence: 99%
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