Mappings of finite distortion: the Rickman-Picard theorem for mappings of finite lower order
From MaRDI portal
Publication:2565883
DOI10.1007/BF02789048zbMath1083.30022WikidataQ110035635 ScholiaQ110035635MaRDI QIDQ2565883
Publication date: 28 September 2005
Published in: Journal d'Analyse Mathématique (Search for Journal in Brave)
Related Items (7)
Quasiregular curves: Hölder continuity and higher integrability ⋮ The Heinz type inequality, Bloch type theorem and Lipschitz characteristic of polyharmonic mappings ⋮ On the lower order of mappings with finite length distortion ⋮ Mappings of finite distortion of polynomial type ⋮ Bloch's theorem for mappings of bounded and finite distortion ⋮ Mappings of finite inner distortion: global homeomorphism theorem ⋮ Sharpness of Rrickman's Picard theorem in all dimensions
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Quasiregular mappings and metrics on the n-sphere with punctures
- On the number of omitted values of entire quasiregular mappings
- A defect relation for quasimeromorphic mappings
- On solutions of the Beltrami equation
- On a method of Holopainen and Rickman
- Mappings of finite distortion: gauge dimension of generalized quasicircles
- On the theory of \(Q(x)\)-homeomorphisms.
- \(\mu(z)\)-homeomorphisms in the plane
- The analogue of Picard's theorem for quasiregular mappings in dimension three
- Mappings of finite distortion: sharp Orlicz-conditions
- Lectures on \(n\)-dimensional quasiconformal mappings
- Mappings with finite length distortion
- Uniform limits of certain A-harmonic functions with applications to quasiregular mappings
- Mappings of finite distortion: Capacity and modulus inequalities
- On the order of quasiregular mappings
- An extension of Reshetnyak's Theorem
- Picard's Theorem and Rickman's Theorem by Way of Harnack's Inequality
- Mappings of finite distortion: The sharp modulus of continuity
- On the degenerate Beltrami equation
- Failure of the Denjoy theorem for quasiregular maps in dimension $n \ge 3$
- On the Behavior of Quasiconformal Mappings at a Point
- BMO-quasiconformal mappings
- Mappings of finite distortion: Monotonicity and continuity
- Traces of monotone functions in weighted Sobolev spaces
- Mappings of finite distortion: Condition \(N\)
- Mappings of finite distortion: Discreteness and openness
This page was built for publication: Mappings of finite distortion: the Rickman-Picard theorem for mappings of finite lower order
