Gideon Bahir-Maschler
Professor, Mathematics
Co-Department Chair, Mathematics
Scholarly Interests
Complex Differential Geometry, Conformal Geometry, Canonical Riemannian metrics
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Professor Gideon Maschler is a mathematician working in the area of differential geometry. His field of expertise is complex differential geometry and its links to Riemannian and Conformal geometry. He studies distinguished Riemannian metrics such as Kähler metrics and Ricci solitons. His work includes connections to generalizaitons of Einstein-Maxwell metrics, group actions, some Lorentizian geometry and index theory.
Professor Maschler received his Ph.D. from the State University of New York at Stony Brook in 1997.
Courses offered:
MATH 130 Linear Algebra
MATH 131 Multivariate Calculus
MATH 172 Introduction to Analysis
MATH 214 Modern Analysis
MATH 216 Complex Variables
MATH 218 Topology
MATH 225 Modern Algebra
MATH 230 Differntial GeometryDegrees
- Ph.D. in Mathematics, State University of New York, Stony Brook, 1997
- B.S., Hebrew University of Jerusalem, 1987
Affiliated Department(s)
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Scholarly and Creative Works
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Weighted extremal Kähler metrics and the Einstein-Maxwell geometry of projective bundles
Published in Communications in Analysis and Geometry
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2022
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Vol. 30
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Issue #4
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On the completeness of some Bianchi type A and related Kähler-Einstein metrics
Published in The Journal of Geometric Analysis
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2021
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Vol. 31
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Canonical Kähler metrics on classes of Lorentzian 4-manifolds
Published in Annals of Global Analysis and Geometry
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2020
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Vol. 57
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Kähler metrics via Lorentzian Geometry in dimension four
Published in Complex Manifolds
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2020
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Vol. 7
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Equivariant APS index for Dirac operators of non-product type near the boundary
Published in Indiana University Mathematics Journal
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2019
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Vol. 68
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Cohomogeneity one central Kähler metrics in dimension four
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Cohomogeneity one Kähler-Ricci solitons under a Heisenberg group action and related metrics
Published in Transformation Groups
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