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THE TRIANGULAR PROPERTIES OF ASSOCIATED LEGENDRE FUNCTIONS USING THE VECTORIAL ADDITION THEOREM FOR SPHERICAL HARMONICS
"... 1 Triangular properties of associated Legendre functions are derived using the Vectorial Addition Theorem of spherical harmonics 1. ..."
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1 Triangular properties of associated Legendre functions are derived using the Vectorial Addition Theorem of spherical harmonics 1.
On triangular decompositions of algebraic varieties
 Presented at the MEGA2000 Conference
, 1999
"... We propose an efficient algorithm for computing triangular decompositions of algebraic varieties. It is based on an incremental process and produces components in order of decreasing dimension. The combination of these two major features is obtained by means of lazy evaluation techniques and a lifti ..."
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Cited by 75 (34 self)
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We propose an efficient algorithm for computing triangular decompositions of algebraic varieties. It is based on an incremental process and produces components in order of decreasing dimension. The combination of these two major features is obtained by means of lazy evaluation techniques and a
Triangular Hopf algebras with the Chevalley property
 Michigan Journal of Mathematics
"... Triangular Hopf algebras were introduced by Drinfeld [Dr]. They are the Hopf algebras whose representations form a symmetric tensor category. In that sense, they are the class of Hopf algebras closest to group algebras. The structure of triangular Hopf algebras is far from ..."
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Cited by 45 (10 self)
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Triangular Hopf algebras were introduced by Drinfeld [Dr]. They are the Hopf algebras whose representations form a symmetric tensor category. In that sense, they are the class of Hopf algebras closest to group algebras. The structure of triangular Hopf algebras is far from
Transport Properties for Triangular Barriers
"... We theoretically study the electronic transport properties of Dirac fermions through one and double triangular barriers in graphene nanoribbon. Using the transfer matrix method, we determine the transmission, conductance and Fano factor. They are obtained to be various parameters dependent such as ..."
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We theoretically study the electronic transport properties of Dirac fermions through one and double triangular barriers in graphene nanoribbon. Using the transfer matrix method, we determine the transmission, conductance and Fano factor. They are obtained to be various parameters dependent
Single resolution compression of arbitrary triangular meshes with properties
 In Data Compression Conference’99 Conference Proceedings
, 1999
"... Polygonal meshes have been used as the primary geometric model representation for networked gaming and for complex interactive design in manufacturing. Accurate polygonal mesh approximation of a surface with sharp features (holes, highly varying curvatures) requires extremely large number of triangl ..."
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Cited by 66 (3 self)
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Polygonal meshes have been used as the primary geometric model representation for networked gaming and for complex interactive design in manufacturing. Accurate polygonal mesh approximation of a surface with sharp features (holes, highly varying curvatures) requires extremely large number of triangles. Transmission of such large triangle meshes is
ON TRIANGULAR CATEGORIES
"... Abstract. The triangular categories defined and studied by P. Leroux [11] are particular Möbius categories. In this paper, considering a latticetriangular category C, we study the basic properties of the ”category of fractions ” I(C) associated to C (the universal property and the representation the ..."
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Abstract. The triangular categories defined and studied by P. Leroux [11] are particular Möbius categories. In this paper, considering a latticetriangular category C, we study the basic properties of the ”category of fractions ” I(C) associated to C (the universal property and the representation
Triangular Heaps
"... In this paper we introduce the triangular heap, a heap with the special property that for every father node its right child (if present) is smaller than its left child. We show how triangular heaps can be applied to the traditional problem of sorting an array in situ in ways quite similar to wellkn ..."
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In this paper we introduce the triangular heap, a heap with the special property that for every father node its right child (if present) is smaller than its left child. We show how triangular heaps can be applied to the traditional problem of sorting an array in situ in ways quite similar to well
Hamiltonian properties of triangular grid graphs
 Discrete Mathematics, 308(24):6166 – 6188
, 2008
"... Abstract: It is known that all 2connected, linearly convex triangular grid graphs, with only one exception, are hamiltonian (Reay and Zamfirescu, 2000). In the paper, it is shown that this result holds for a wider class of connected, locally connected triangular grid graphs and, with more exception ..."
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Cited by 9 (0 self)
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Abstract: It is known that all 2connected, linearly convex triangular grid graphs, with only one exception, are hamiltonian (Reay and Zamfirescu, 2000). In the paper, it is shown that this result holds for a wider class of connected, locally connected triangular grid graphs and, with more
Measuring Shape: Ellipticity, Rectangularity, and Triangularity
 Machine Vision and Applications, forthcoming
, 2000
"... Object classification often operates by making decisions based on the values of several shape properties measured from the image. This paper describes and tests several algorithms for calculating ellipticity, rectangularity, and triangularity shape descriptors. ..."
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Cited by 48 (13 self)
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Object classification often operates by making decisions based on the values of several shape properties measured from the image. This paper describes and tests several algorithms for calculating ellipticity, rectangularity, and triangularity shape descriptors.
CERTAIN PROPERTIES OF TRIANGULAR TRANSFORMATIONS OF MEASURES
"... Abstract. We study convergence of triangular mappings on Rn, i.e., mappings T such that the ith coordinate function Ti depends only on the variables x1,..., xi. We show that under broad assumptions the inverse mapping to a canonical triangular transformation is canonical triangular as well. An exam ..."
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Abstract. We study convergence of triangular mappings on Rn, i.e., mappings T such that the ith coordinate function Ti depends only on the variables x1,..., xi. We show that under broad assumptions the inverse mapping to a canonical triangular transformation is canonical triangular as well
Results 1  10
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