• Japan

Fingerprint The fingerprint is based on mining the text of the scientific documents related to the associated persons. Based on that an index of weighted terms is created, which defines the key subjects of research unit

Hamilton-Jacobi Equation Mathematics
Peano Continuum Mathematics
Fundamental Group Mathematics
Viscosity Solutions Mathematics
Hamiltonians Engineering & Materials Science
Homology Groups Mathematics
Boundary conditions Engineering & Materials Science
Behavior of Solutions Mathematics

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Profiles

No photo of Martin Guest

Martin Guest

Person: Academic

19872017
No photo of Kiichiro Hashimoto
19802012
No photo of Matthias Georg Hieber

Matthias Georg Hieber

Person: Academic

19892018

Research Output 1983 2018

Green function, Painlevé VI equation, and Eisenstein series of weight one

Chen, Z., Kuo, T. J., Lin, C. S. & Wang, C. L., 2018 Feb 1, In : Journal of Differential Geometry. 108, 2, p. 185-241 57 p.

Research output: Contribution to journalArticle

Eisenstein Series
Painlevé
Singular Point
Green's function
Critical point
7 Citations

A convergence result for the ergodic problem for Hamilton–Jacobi equations with Neumann-type boundary conditions

Al-Aidarous, E. S., Alzahrani, E. O., Ishii, H. & Younas, A. M. M., 2016 Mar 3, (Accepted/In press) In : Royal Society of Edinburgh - Proceedings A. p. 1-18 18 p.

Research output: Contribution to journalArticle

Hamilton-Jacobi Equation
Convergence Results
Boundary conditions
Discount Factor
Representation Formula

Cotorsion-free groups from a topological viewpoint

Eda, K. & Fischer, H., 2016 Dec 1, In : Topology and its Applications. 214, p. 21-34 14 p.

Research output: Contribution to journalArticle

Peano Continuum
Homology Groups
Free Group
Fundamental Group
Homomorphisms