The rigid-flexible value for symplectic embeddings of four-dimensional ellipsoids into polydiscs

• dc.contributor.author: Jin, Alvin
• dc.contributor.author: Lee, Andrew
• dc.date.issued: 2023-08-24
• dc.identifier.uri: https://hdl.handle.net/1721.1/152301
• dc.description.abstract: Abstract We consider the embedding function $$c_b(a)$$ c b ( a ) describing the problem of symplectically embedding an ellipsoid E(1, a) into the smallest scaling of the polydisc P(1, b). Previous work suggests that determining the entirety of $$c_b(a)$$ c b ( a ) for all b is difficult, as infinite staircases can appear for many sequences of irrational b. In contrast, we show that for every polydisc P(1, b) with $$b>2$$ b > 2 , there is an explicit formula for the minimum a such that the embedding problem is determined only by volume. That is, when the ellipsoid is sufficiently stretched, there is a symplectic embedding of E(1, a) fully filling an appropriately scaled polydisc $$P(\lambda ,\lambda b)$$ P ( λ , λ b ) . Denoted RF(b), this rigid-flexible (RF) value is piecewise smooth with a discrete set of discontinuities for $$b>2$$ b > 2 . At the same time, by exhibiting a sequence of obstructive classes for $$b_n = \frac{n+1}{n}$$ b n = n + 1 n at $$a=8$$ a = 8 , we show that RF is also discontinuous at $$b=1$$ b = 1 .
• dc.publisher: Springer International Publishing
• dc.relation.isversionof: https://doi.org/10.1007/s11784-023-01080-w
• dc.source: Springer International Publishing
• dc.type: Article
• dc.identifier.citation: Journal of Fixed Point Theory and Applications. 2023 Aug 24;25(3):79
• dc.contributor.department: Massachusetts Institute of Technology. Department of Mathematics
• dc.eprint.version: Author's final manuscript
• dc.language.rfc3066: en