Librarian View
LEADER
03165nam a22005295i 4500
001
16369086
005
20220923140824.0
006
m o d
007
cr nn 008mamaa
008
220921s2022 sz | o |||| 0|eng d
020
|a
9783031151279
024
7
|a
10.1007/978-3-031-15127-9
|2
doi
035
|a
(DE-He213)978-3-031-15127-9
050
4
|a
QA440-699
100
1
|a
Schneider, Rolf.
|e
author.
|4
aut
|4
http://id.loc.gov/vocabulary/relators/aut
245
1
0
|a
Convex Cones
|h
[electronic resource] :
|b
Geometry and Probability /
|c
by Rolf Schneider.
250
|a
1st ed. 2022.
264
1
|a
Cham :
|b
Springer International Publishing :
|b
Imprint: Springer,
|c
2022.
300
|a
1 online resource (X, 347 p.) 1 illus.
336
|a
text
|b
txt
|2
rdacontent
337
|a
computer
|b
c
|2
rdamedia
338
|a
online resource
|b
cr
|2
rdacarrier
347
|a
text file
|b
PDF
|2
rda
490
1
|a
Lecture Notes in Mathematics,
|x
1617-9692 ;
|v
2319
505
0
|a
Basic notions and facts -- Angle functions -- Relations to spherical geometry -- Steiner and kinematic formulas -- Central hyperplane arrangements and induced cones -- Miscellanea on random cones -- Convex hypersurfaces adapted to cones.
506
|a
Access restricted by licensing agreement.
520
|a
This book provides the foundations for geometric applications of convex cones and presents selected examples from a wide range of topics, including polytope theory, stochastic geometry, and Brunn-Minkowski theory. Giving an introduction to convex cones, it describes their most important geometric functionals, such as conic intrinsic volumes and Grassmann angles, and develops general versions of the relevant formulas, namely the Steiner formula and kinematic formula. In recent years questions related to convex cones have arisen in applied mathematics, involving, for example, properties of random cones and their non-trivial intersections. The prerequisites for this work, such as integral geometric formulas and results on conic intrinsic volumes, were previously scattered throughout the literature, but no coherent presentation was available. The present book closes this gap. It includes several pearls from the theory of convex cones, which should be better known. .
590
|a
Access is available to the Yale community.
650
0
|a
Geometry.
650
0
|a
Probabilities.
650
0
|a
Convex geometry .
650
0
|a
Discrete geometry.
710
2
|a
SpringerLink (Online service)
730
0
|a
Springer ENIN.
773
0
|t
Springer Nature eBook
776
0
8
|i
Printed edition:
|z
9783031151262
776
0
8
|i
Printed edition:
|z
9783031151286
830
0
|a
Lecture Notes in Mathematics,
|x
1617-9692 ;
|v
2319
852
8
0
|b
yulint
|h
None
|z
Online resource
852
8
0
|z
Online resource
856
4
0
|y
Online book
|u
https://yale.idm.oclc.org/login?URL=https://doi.org/10.1007/978-3-031-15127-9
901
|a
QA440-699
902
|a
Yale Internet Resource
|b
Yale Internet Resource >> None|DELIM|16285585
905
|a
online resource
907
|a
2022-09-23T14:08:24.000Z
946
|a
DO NOT EDIT. DO NOT EXPORT.
953
|a
https://doi.org/10.1007/978-3-031-15127-9