![]() The Bernstein–Sato ideal of hyperplane arrangements has recently also been studied using different methods in, , and. It turns out that in this case the object involved has already extensively been studied under a different name: it is the matroid polytope of, and Proposition 2.4 in loc. We prove this conjecture for the case of indecomposable central hyperplane arrangements, in which case it proves for complete factorizations of hyperplane arrangements. This conjecture is formulated in terms of the log-canonical threshold polytope of the tuple |$F$|. In Subsection 4.2, we formulate a conjecture related to these affine translates. Theorem 4.4 provides information on the slopes of the Bernstein–Sato variety, but not on the affine translation with which these slopes appear. ![]() Theorem 4.4 explains in a rigorous way the observations made in. Let |$X$| be a smooth closed subvariety of the algebraic torus |$(_F)$| are incomparable in the sense that either can contain irreducible components not contained in the other one. The theory of polyhedra and the dimension of the faces are analyzed by looking at these intersections involving hyperplanes.1 Introduction Maximum likelihood estimation The intersection of P and H is defined to be a "face" of the polyhedron. In Cartesian coordinates, such a hyperplane can be described with a single linear equation of the following form (where at least one of the a i. Some of these specializations are described here.Īn affine hyperplane is an affine subspace of codimension 1 in an affine space. Several specific types of hyperplanes are defined with properties that are well suited for particular purposes. A hyperplane in a Euclidean space separates that space into two half spaces, and defines a reflection that fixes the hyperplane and interchanges those two half spaces. If V is a vector space, one distinguishes "vector hyperplanes" (which are linear subspaces, and therefore must pass through the origin) and "affine hyperplanes" (which need not pass through the origin they can be obtained by translation of a vector hyperplane). The space V may be a Euclidean space or more generally an affine space, or a vector space or a projective space, and the notion of hyperplane varies correspondingly since the definition of subspace differs in these settings in all cases however, any hyperplane can be given in coordinates as the solution of a single (due to the "codimension 1" constraint) algebraic equation of degree 1. In geometry, a hyperplane of an n-dimensional space V is a subspace of dimension n − 1, or equivalently, of codimension 1 in V. Therefore, a necessary and sufficient condition for S to be a hyperplane in X is for S to have codimension one in X. The difference in dimension between a subspace S and its ambient space X is known as the codimension of S with respect to X. While a hyperplane of an n-dimensional projective space does not have this property. For instance, a hyperplane of an n-dimensional affine space is a flat subset with dimension n − 1 and it separates the space into two half spaces. In different settings, hyperplanes may have different properties. This notion can be used in any general space in which the concept of the dimension of a subspace is defined. For example, if a space is 3-dimensional then its hyperplanes are the 2-dimensional planes, while if the space is 2-dimensional, its hyperplanes are the 1-dimensional lines. ![]() In geometry, a hyperplane is a subspace whose dimension is one less than that of its ambient space. A plane is a hyperplane of dimension 2, when embedded in a space of dimension 3. Two intersecting planes in three-dimensional space. ![]()
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