250091 VO Selected topics in combinatorics (2011S)
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Vorbesprechung am Donnerstag, 3. März 2011, 13.00 Uhr, Seminarraum
D 101 (UZA 4)
D 101 (UZA 4)
Details
Language: German
Examination dates
Lecturers
Classes
Currently no class schedule is known.
Information
Aims, contents and method of the course
Assessment and permitted materials
mündliche Prüfung
Minimum requirements and assessment criteria
A hyperplane arrangement is simply a finite set of hyperplanes in
n-dimensional Euclidian space. In this course, I shall provide an
introduction to the theory of these hyperplane arrangements. This
is an extremely rich theory, since it connects, at the same time,
geometric, combinatorial and algebraic aspects. As a basis for the
course, I shall use Richard Stanley's article "An Introduction to Hyperplane Arrangements."
n-dimensional Euclidian space. In this course, I shall provide an
introduction to the theory of these hyperplane arrangements. This
is an extremely rich theory, since it connects, at the same time,
geometric, combinatorial and algebraic aspects. As a basis for the
course, I shall use Richard Stanley's article "An Introduction to Hyperplane Arrangements."
Examination topics
A hyperplane arrangement is simply a finite set of hyperplanes in
n-dimensional Euclidian space. In this course, I shall provide an
introduction to the theory of these hyperplane arrangements. This
is an extremely rich theory, since it connects, at the same time,
geometric, combinatorial and algebraic aspects. As a basis for the
course, I shall use Richard Stanley's article "An Introduction to Hyperplane Arrangements."
n-dimensional Euclidian space. In this course, I shall provide an
introduction to the theory of these hyperplane arrangements. This
is an extremely rich theory, since it connects, at the same time,
geometric, combinatorial and algebraic aspects. As a basis for the
course, I shall use Richard Stanley's article "An Introduction to Hyperplane Arrangements."
Reading list
Richard Stanley: "An Introduction to Hyperplane Arrangements"
http://www.math.umn.edu/~ezra/PCMI2004/stanley.jcp.pdf
http://www.math.umn.edu/~ezra/PCMI2004/stanley.jcp.pdf
Association in the course directory
MALV
Last modified: We 19.08.2020 08:05
n-dimensional Euclidian space. In this course, I shall provide an
introduction to the theory of these hyperplane arrangements. This
is an extremely rich theory, since it connects, at the same time,
geometric, combinatorial and algebraic aspects. As a basis for the
course, I shall use Richard Stanley's article "An Introduction to Hyperplane Arrangements."