Busemann space

E855797

A Busemann space is a type of geodesic metric space characterized by a convexity condition on distance functions, generalizing nonpositively curved spaces in the sense of metric geometry.

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Busemann space canonical 1

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Predicate Object
instanceOf geodesic metric space
mathematical concept
metric space
contrastWith Alexandrov space of curvature bounded above NERFINISHED
Gromov hyperbolic space NERFINISHED
definedBy convexity of distance along geodesics
midpoint distance convexity condition
field geometry
metric geometry
generalizes Banach space with strictly convex norm
CAT(0) space NERFINISHED
Hadamard manifold NERFINISHED
nonpositively curved Riemannian manifold
strictly convex normed space
hasConcept Busemann function NERFINISHED
horofunction boundary
hasCondition for any two geodesics the distance function between corresponding points is convex
metric is convex along geodesics
hasExample CAT(0) cube complex
Hilbert space
finite-dimensional normed vector space with strictly convex norm
real tree
simply connected complete Riemannian manifold with nonpositive sectional curvature
hasProperty distance convexity
distance to a geodesic is convex along any geodesic
geodesic
geodesic extension property in many standard examples
metric is determined by its geodesic structure and convexity condition in many settings
midpoints between any two points are unique
nonpositive curvature in Busemann sense
uniquely geodesic
implies contractibility under mild completeness assumptions
existence of metric projections onto closed convex sets (under completeness)
metric convexity of closed balls
no geodesic branching
uniqueness of geodesics between points
isWeakerThan CAT(0) curvature condition
namedAfter Herbert Busemann NERFINISHED
studiedIn nonlinear functional analysis
topological methods in metric geometry
usedIn convexity theory in metric spaces
fixed point theory
geometric group theory
global Riemannian geometry

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Herbert Busemann hasConceptNamedAfter Busemann space