Positive area and inaccessible fixed points for hedgehogs

Biswas, Kingshook

doi:10.1017/etds.2014.143

Cited by 6 publications

(5 citation statements)

References 8 publications

Supporting

Mentioning

Contrasting

Unclassified

Order By: Relevance

“…Biswas 研究了含 Cremer 点的全纯函数芽, 证明了存在一些不含内点的刺猬, 其 Hausdorff 维数可以等于 1 [98] , 面积也可以为正 [99] . 含 Cremer 点的二次多项式 Julia 集的拓扑结构研究还可参见文献 [105,701].…”

Section: 耦合问题unclassified

A brief introduction to one-dimensional complex dynamics

Fei

2024

Sci. Sin.-Math.

View full text Add to dashboard Cite

. 1879 年, Cayley [168] 建议用该方法求解复多项式的根. 但他发现这个问题即使对于三次复多项式也已经非常困难: "The case of the cubic equation appears to present considerable difficulty." 从今天的视角来看, Cayley 在那时遇到困难是不可避免的, 因为他要解决的问题是计算一个三次有理函数的 Julia 集 (见图 1).Cayley 并不是第一个在 19 世纪 70 年代研究迭代的人. Schröder 在 1870-1871 年也考虑了用迭代法解方程, 同时还对下面的 Schröder 方程做了研究 3) :1884 年, Koenigs [416] 证明了如果导数 (或称 "乘子") λ = f ′ (0) 满足 |λ| ̸ =

show abstract

Section: 耦合问题unclassified

A brief introduction to one-dimensional complex dynamics

Fei

2024

Sci. Sin.-Math.

View full text Add to dashboard Cite

show abstract

“…The topology of K 0 is complex ([4], [5], [22]) and in particular K 0 is never locally connected, and h 0 does not extend to a continuous correspondence between S 1 and ∂K 0 . Nevertheless, f extends continuously to Caratheodory's prime-end compactification of C − K 0 .…”

Section: Flow Interpolation In Cmentioning

confidence: 99%

Solution to Briot and Bouquet problem on singularities of differential equations

Perez-Marco

2018

Preprint

View full text Add to dashboard Cite

We solve Briot and Bouquet problem on the existence of non-monodromic (multivalued) solutions for singularities of differential equations in the complex domain. The solution is an application of hedgehog dynamics for indifferent irrational fixed points. We present an important simplification by only using a local hedgehog for which we give a simpler and direct construction of quasi-invariant curves which does not rely on complex renormalization.

show abstract

“…When f is non-linearizable, these are called hedgehogs. The topology and dynamics of hedgehogs have been studied by Pérez-Marco [PM94,PM96], who also developed techniques using 'tube-log Riemann surfaces' [BPM15a,BPM15b,BPM13] for the construction of interesting examples [PM93, PM95, PM00] of indifferent germs and hedgehogs, which were also used by the author [Bis05,Bis08,Bis16] and Chéritat [Ch11] to construct further examples.…”

Section: Introductionmentioning

confidence: 99%

Loewner evolution of hedgehogs and 2-conformal measures of circle maps

Biswas¹

2020

Ergod. Th. Dynam. Sys.

Self Cite

View full text Add to dashboard Cite

Let f be a germ of a holomorphic diffeomorphism with an irrationally indifferent fixed point at the origin in $${\mathbb C}$$ (i.e. $$f(0) = 0, f'(0) = e^{2\pi i \alpha }, \alpha \in {\mathbb R} - {\mathbb Q}$$ ). Pérez-Marco [Fixed points and circle maps. Acta Math.179(2) (1997), 243–294] showed the existence of a unique continuous monotone one-parameter family of non-trivial invariant full continua containing the fixed point called Siegel compacta, and gave a correspondence between germs and families $$(g_t)$$ of circle maps obtained by conformally mapping the complement of these compacts to the complement of the unit disk. The family of circle maps $$(g_t)$$ is the orbit of a locally defined semigroup $$(\Phi _t)$$ on the space of analytic circle maps, which we show has a well-defined infinitesimal generator X. The explicit form of X is obtained by using the Loewner equation associated to the family of hulls $$(K_t)$$ . We show that the Loewner measures $$(\mu _t)$$ driving the equation are 2-conformal measures on the circle for the circle maps $$(g_t)$$ .

show abstract

Positive area and inaccessible fixed points for hedgehogs

Cited by 6 publications

References 8 publications

A brief introduction to one-dimensional complex dynamics

A brief introduction to one-dimensional complex dynamics

Solution to Briot and Bouquet problem on singularities of differential equations

Loewner evolution of hedgehogs and 2-conformal measures of circle maps

Contact Info

Product

Resources

About