Isoperimetric and ergodic properties of horospheres in symmetric spaces
(2001)
Presentation / Conference Contribution
Peyerimhoff, N. (2001, December). Isoperimetric and ergodic properties of horospheres in symmetric spaces. Presented at Smooth Ergodic Theory and Its Applications, University of Washington, Seattle
Outputs (69)
Curvature and Geometry of Tessellating Plane Graphs (2001)
Journal Article
Baues, O., & Peyerimhoff, N. (2001). Curvature and Geometry of Tessellating Plane Graphs. Discrete & Computational Geometry, 25(1), 141-159. https://doi.org/10.1007/s004540010076We show that the growth of plane tessellations and their edge graphs may be controlled from below by upper bounds for the combinatorial curvature. Under the assumption that every geodesic path may be extended to infinity we provide explicit estimates... Read More about Curvature and Geometry of Tessellating Plane Graphs.
Spectral gaps of Schroedinger operators on hyperbolic space (2000)
Journal Article
Karp, L., & Peyerimhoff, N. (2000). Spectral gaps of Schroedinger operators on hyperbolic space. Mathematische Nachrichten, 217, 105-124This paper is mainly concerned with estimates of spectral gaps of Schroedinger operators with smooth potential on real hyperbolic space. The estimates are obtained by explicit constructions of approximate generalized eigenfunctions. Among the results... Read More about Spectral gaps of Schroedinger operators on hyperbolic space.
Horospherical means and uniform distribution of curves of constant geodesic curvature (1999)
Journal Article
Karp, L., & Peyerimhoff, N. (1999). Horospherical means and uniform distribution of curves of constant geodesic curvature. Mathematische Zeitschrift, 231, 655-677. https://doi.org/10.1007/pl00004745
On index formulas for manifolds with metric horns (1998)
Journal Article
Lesch, M., & Peyerimhoff, N. (1998). On index formulas for manifolds with metric horns. Communications in Partial Differential Equations, 23(3 & 4), 649-684In this paper we discuss the index problem for geometric differential operators (Spin-Dirac operator, Gauss-Bonnet operator, Signature operator) on manifolds with metric horns. On singular manifolds these operators in general do not have unique close... Read More about On index formulas for manifolds with metric horns.
On the distribution of hypersurfaces equidistant from totally geodesic submanifolds in hyperbolic space (1998)
Journal Article
Karp, L., & Peyerimhoff, N. (1998). On the distribution of hypersurfaces equidistant from totally geodesic submanifolds in hyperbolic space. Analysis, 18, 217-225. https://doi.org/10.1524/anly.1998.18.3.217Let H be the n-dimensional real hyperbolic space and pi: H -> M be the universal covering map of a compact Riemannian manifold M of constant curvature -1. Let P be a k-dimensional complete totally geodesic submanifold of H and P_r be the correspondin... Read More about On the distribution of hypersurfaces equidistant from totally geodesic submanifolds in hyperbolic space.
Areas and intersections in convex domains (1997)
Journal Article
Peyerimhoff, N. (1997). Areas and intersections in convex domains. The American Mathematical Monthly, 104(8), 697-704. https://doi.org/10.2307/2975231
Mathematik in Anwendung mit C++ (1994)
Book
Huettenhofer, M., Lesch, M., & Peyerimhoff, N. (1994). Mathematik in Anwendung mit C++. Quelle & MeyerIn diesem Buch werden ausgewaehlte Themen der Mathematik dargestellt, die sich besonders gut durch Algorithmen veranschaulichen lassen. Im zahlentheoretischen Teil des Buches geht es um die Teilbarkeit ganzer Zahlen und um Primzahlen - eine Thematik,... Read More about Mathematik in Anwendung mit C++.
The del-bar-operator on algebraic curves (1990)
Journal Article
Bruening, J., Peyerimhoff, N., & Schroeder, H. (1990). The del-bar-operator on algebraic curves. Communications in Mathematical Physics, 129, 525-534. https://doi.org/10.1007/bf02097104For a singular algebraic curve we show that all closed extensions of del-bar are Fredholm, and we give a general index formula. In particular, we prove a modified version of a conjecture due to Mac Pherson.