The Schwarz lemma in Clifford analysis
From MaRDI portal
Publication:5401364
DOI10.1090/S0002-9939-2014-11854-5zbMath1295.30119OpenAlexW1983569645WikidataQ124968272 ScholiaQ124968272MaRDI QIDQ5401364
Publication date: 13 March 2014
Published in: Proceedings of the American Mathematical Society (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1090/s0002-9939-2014-11854-5
Related Items
The Schwarz lemma for functions with values in \(C(V_{n,0})\) ⋮ The Schwarz type lemma in upper half space in Clifford analysis ⋮ Riemann boundary value problems for monogenic functions on the hyperplane ⋮ Schwarz's lemma for slice Clifford analysis ⋮ Some estimates for the Cauchy transform in higher dimensions ⋮ The Schwarz lemma in bicomplex analysis ⋮ New versions of the Plemelj-Sochocki formula in Clifford analysis ⋮ Schwarz lemma at the boundary of the unit polydisk in \(\mathbb C^n\) ⋮ A version of Schwarz lemma associated to the \(k\)-Cauchy-Fueter operator ⋮ Some integral representations and singular integral over plane in Clifford analysis ⋮ Schwarz-type lemmas associated to a Helmholtz equation ⋮ Dirac operators with gradient potentials and related monogenic functions
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Hypermonogenic functions and Möbius transformations
- Morera type problems in Clifford analysis.
- On \(k\)-regular functions with values in a universal Clifford algebra
- Iterated integral operators in Clifford analysis
- Clifford analysis: History and perspective
- Higher-order partial differential equations in Clifford analysis. Effective solutions to problems
- On regular-analytic functions with values in a Clifford-algebra
- On the singularities of functions with values in a Clifford algebra
- Schwarz lemma in Euclidean spaces
- Hypercomplex Function Theory and Hilbert Modules with Reproducing Kernel
- Some properties of operators in Clifford analysis
This page was built for publication: The Schwarz lemma in Clifford analysis
