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On Rectifying Dual Space Curves
 Rev. Mat. Complut
"... We give some characterizations of the rectifying curves in the dual space and show that rectifying dual space curves can be stated with the aid of dual unit spherical curves. Thus, we have a link between rectifying dual space curves and classical surfaces in the Euclidean threespace. Key words: dua ..."
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Cited by 3 (0 self)
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We give some characterizations of the rectifying curves in the dual space and show that rectifying dual space curves can be stated with the aid of dual unit spherical curves. Thus, we have a link between rectifying dual space curves and classical surfaces in the Euclidean threespace. Key words
Application of Covariant Derivative in the Dual Space
"... In this paper,Covariant derivative of a dual vector field Y ̄ in the direction a dual vector field X ̄ is accomplished the dual Space Dn. The dual space Dn is decomposed in two similar terms. It has been shown that these terms are related.We have extended to concept of covariant derivative in the du ..."
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In this paper,Covariant derivative of a dual vector field Y ̄ in the direction a dual vector field X ̄ is accomplished the dual Space Dn. The dual space Dn is decomposed in two similar terms. It has been shown that these terms are related.We have extended to concept of covariant derivative
ON MANNHEIM PARTNER CURVE IN DUAL SPACE
"... In this paper, we define Mannheim partner curves in three dimensional dual space D 3 and we obtain the necessary and sufficient conditions for the Mannheim partner curves in dual space D 3. 1 ..."
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Cited by 2 (1 self)
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In this paper, we define Mannheim partner curves in three dimensional dual space D 3 and we obtain the necessary and sufficient conditions for the Mannheim partner curves in dual space D 3. 1
Dual space search during scientific reasoning
 Cognitive Science
, 1988
"... NOTICE WARNING CONCERNING COPYRIGHT RESTRICTIONS: The copyright law of the United States (title 17, U.S. Code) governs the making of photocopies or other reproductions of copyrighted material. Any copying of this document without permission of its author may be prohibited by law. ..."
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Cited by 182 (16 self)
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NOTICE WARNING CONCERNING COPYRIGHT RESTRICTIONS: The copyright law of the United States (title 17, U.S. Code) governs the making of photocopies or other reproductions of copyrighted material. Any copying of this document without permission of its author may be prohibited by law.
On The Dual Darboux Rotation Axis Of The Dual Space Curve
 Demonstratio Mathematica No
, 2002
"... In this paper, the Dual Darboux rotation axis for timelike dual space curve in the semidual space D31 is decomposed in two simultaneous rotation. The axis of these simultaneous rotations are joined by a simple mechanism. This study is original corresponding in the semidual space D31 of the article ..."
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Cited by 5 (1 self)
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In this paper, the Dual Darboux rotation axis for timelike dual space curve in the semidual space D31 is decomposed in two simultaneous rotation. The axis of these simultaneous rotations are joined by a simple mechanism. This study is original corresponding in the semidual space D31
Preconditioning Conjugate Gradients in Dual Space
, 2013
"... Abstract In this project, we study the conjugate gradient method used to solve nonlinear leastsquare problem in the dual space. We first employ standard Lagrangian dual method to transform the least square problem into its dual problem, whose solution can be derived in a close linear form. Correspo ..."
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Abstract In this project, we study the conjugate gradient method used to solve nonlinear leastsquare problem in the dual space. We first employ standard Lagrangian dual method to transform the least square problem into its dual problem, whose solution can be derived in a close linear form
Dual polyhedra and mirror symmetry for Calabi–Yau hypersurfaces in toric varieties
 J. Alg. Geom
, 1994
"... We consider families F(∆) consisting of complex (n − 1)dimensional projective algebraic compactifications of ∆regular affine hypersurfaces Zf defined by Laurent polynomials f with a fixed ndimensional Newton polyhedron ∆ in ndimensional algebraic torus T = (C ∗ ) n. If the family F(∆) defined by ..."
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Cited by 467 (20 self)
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by a Newton polyhedron ∆ consists of (n − 1)dimensional CalabiYau varieties then the dual, or polar, polyhedron ∆ ∗ in the dual space defines another family F( ∆ ∗ ) of CalabiYau varieties, so that we obtain the remarkable duality between two different families of CalabiYau varieties. It is shown
A DIRECT SUM DECOMPOSITION FOR DUAL SPACES.
, 2005
"... Abstract. We developpe a direct sum decomposition for ndual spaces. ..."
SELFSELFDUAL SPACES OF POLYNOMIALS
, 2003
"... Abstract. A space of polynomials V of dimension 7 is called selfdual if the divided Wronskian of any 6subspace is in V. A selfdual space V has a natural inner product. The divided Wronskian of any isotropic 3subspace of V is a square of a polynomial. We call V selfselfdual if the square root o ..."
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Abstract. A space of polynomials V of dimension 7 is called selfdual if the divided Wronskian of any 6subspace is in V. A selfdual space V has a natural inner product. The divided Wronskian of any isotropic 3subspace of V is a square of a polynomial. We call V selfselfdual if the square root
Results 1  10
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527,268