The h∗-Polynomials of Locally Anti-Blocking Lattice Polytopes and Their γ-Positivity
The h∗-Polynomials of Locally Anti-Blocking Lattice Polytopes and Their γ-Positivity
About this item
Full title
The h∗-Polynomials of Locally Anti-Blocking Lattice Polytopes and Their γ-Positivity
Author / Creator
Publisher
New York: Springer US
Journal title
Discrete & computational geometry, 2021-09, Vol.66 (2), p.701-722
Language
English
Formats
Publication information
Publisher
New York: Springer US
Subjects
More information
Scope and Contents
Contents
A lattice polytope
P
⊂
R
d
is called a locally anti-blocking polytope if for any closed orthant
R
ε
d
in
R
d
,
P
∩
R
ε
d
is unimodularly equivalent to an anti-blocking polytope by reflections of coordinate hyperplanes. We give a formula for the
h
∗
-polynomials of locally anti-blocking...
Alternative Titles
Full title
The h∗-Polynomials of Locally Anti-Blocking Lattice Polytopes and Their γ-Positivity
Authors, Artists and Contributors
Author / Creator
Identifiers
Primary Identifiers
Record Identifier
TN_cdi_proquest_journals_2556160257
Permalink
https://devfeature-collection.sl.nsw.gov.au/record/TN_cdi_proquest_journals_2556160257
Other Identifiers
ISSN
0179-5376
E-ISSN
1432-0444
DOI
10.1007/s00454-020-00236-6
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