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Title : 18.318 Topics in Algebraic Combinatorics (MIT)

Title : 18.318 Topics in Algebraic Combinatorics (MIT)

Description : The course consists of a sampling of topics from algebraic combinatorics. The topics include the matrix-tree theorem and other applications of linear algebra, applications of commutative and exterior algebra to counting faces of simplicial complexes, and applications of algebra to tilings.

Description : The course consists of a sampling of topics from algebraic combinatorics. The topics include the matrix-tree theorem and other applications of linear algebra, applications of commutative and exterior algebra to counting faces of simplicial complexes, and applications of algebra to tilings.

Fromsemester : Spring

Fromsemester : Spring

Fromyear : 2006

Fromyear : 2006

Creator :

Creator :

Date : 2006-07-10T16:40:31+05:00

Date : 2006-07-10T16:40:31+05:00

Relation : 18.318

Relation : 18.318

Language : en-US

Language : en-US

Subject : algebraic combinatorics

Subject : algebraic combinatorics

Subject : matrix-tree theorem

Subject : matrix-tree theorem

Subject : linear algebra

Subject : linear algebra

Subject : commutative algebra

Subject : commutative algebra

Subject : exterior algebra

Subject : exterior algebra

Subject : counting faces of simplicial complexes

Subject : counting faces of simplicial complexes

Subject : tilings

Subject : tilings

Subject : Young's lattice

Subject : Young's lattice

Subject : Shannon capacity

Subject : Shannon capacity

Subject : Fisher inequality

Subject : Fisher inequality

Subject : Hadamard matrices

Subject : Hadamard matrices

Subject : f-vectors

Subject : f-vectors

Subject : Sperner Property

Subject : Sperner Property

Subject : -Binomial Coeffcients

Subject : -Binomial Coeffcients