Arrangements of HyperplanesSpringer-Verlag, 1992 - 325页 |
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共有 22 个结果,这是第 1-3 个
第28页
... face . The support | P of a face P is its affine linear span . Each face is open in its support . Let P denote the closure of P in V. The set L ( A ) is partially ordered by reverse inclusion : P≤Q if QC P. We call L ( A ) the face ...
... face . The support | P of a face P is its affine linear span . Each face is open in its support . Let P denote the closure of P in V. The set L ( A ) is partially ordered by reverse inclusion : P≤Q if QC P. We call L ( A ) the face ...
第30页
... face poset of Example 1.6 is in Figure 2.5 . It is identified with the oriented matroid . The face poset is a sharper invariant than the intersection poset . Arrangements A and B in Figure 2.6 are L - equivalent , but they have different ...
... face poset of Example 1.6 is in Figure 2.5 . It is identified with the oriented matroid . The face poset is a sharper invariant than the intersection poset . Arrangements A and B in Figure 2.6 are L - equivalent , but they have different ...
第32页
... face poset of Example 1.6 is in Figure 2.5 . It is identified with the oriented matroid . The face poset is a sharper invariant than the intersection poset . Arrangements A and B in Figure 2.6 are L - equivalent , but they have different ...
... face poset of Example 1.6 is in Figure 2.5 . It is identified with the oriented matroid . The face poset is a sharper invariant than the intersection poset . Arrangements A and B in Figure 2.6 are L - equivalent , but they have different ...
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常见术语和短语
A₁ affine arrangement algebra A(A arrangement and let assume b₁ basic derivations basic invariants basis for D(A braid arrangement broken circuit central arrangement chain complex choose cohomology complement complex reflection groups complexification compute Corollary Coxeter group defining polynomial Definition deformation retraction degree denote dependent exact sequence Example exterior algebra exterior product fiber finite follows from Lemma follows from Proposition follows from Theorem formula free arrangement free with exp G-orbit graded K-module graph H₁ H₂ homogeneous homotopy type hyperplanes inductively free integers irreducible isomorphism K-algebra ker(x l-arrangement lattice Lemma Let G linear linearly independent matrix maximal element Möbius function modular elements module N¹(A nonempty Note Orbits Poincaré polynomial poset Proof prove real arrangement Recall reflection arrangement restriction result Saito's criterion 4.19 Section Shephard groups simplicial subset subspace supersolvable supersolvable arrangement Suppose surjective vertex w₁ write x-independent