... and also the latus rectum of the diameter |
conjugate
Apollonius of Perga’s on Conics: Book Eight Restored or the Book on Determinate Problems Conjectured Apollonius of Perga’s on Conics: Book Eight Restored or the Book on Determinate Problems Conjectured Fried, Michael N. |
to it. ... |
... the notation $$x\sim y$$ means $$x,y$$ are |
conjugate
Elementary abelian 2-subgroups of compact Lie groups Elementary abelian 2-subgroups of compact Lie groups Yu, Jun |
in $$G$$ , i.e., $$y=gxg^{-1}$$ for some ... |
... of H carries F to an abelian subgroup |
conjugate
Maximal abelian subgroups of compact simple Lie groups of type E Maximal abelian subgroups of compact simple Lie groups of type E Yu, Jun |
to it in G. ... |
... for computing the convex (Legendre-Fenchel) |
conjugate
Computing the partial conjugate of convex piecewise linear-quadratic bivariate functions Computing the partial conjugate of convex piecewise linear-quadratic bivariate functions Gardiner, Bryan; Jakee, Khan; Lucet, Yves |
of convex PLQ functions of two variables, ... |
... we have: i). an element x ≠ 1 cannot be |
conjugate
Nilpotent Groups and Solvable Groups Nilpotent Groups and Solvable Groups Machì, Antonio |
to its inverse; ii). if x n = y n then x = ... |
... Three |
conjugate
Some nonlinear conjugate gradient methods based on spectral scaling secant equations Some nonlinear conjugate gradient methods based on spectral scaling secant equations Liu, Hao; Yao, Yi; Qian, Xiaoyan; Wang, Haijun |
gradient methods based on the spectral ... |
... we need to know the distribution of the |
conjugate
The adjacency graphs of some feedback shift registers The adjacency graphs of some feedback shift registers Li, Ming; Jiang, Yupeng; Lin, Dongdai |
pairs in the cycles of the FSR, which is ... |
... We compute the |
conjugate
Central conjugate locus of 2-step nilpotent Lie groups Central conjugate locus of 2-step nilpotent Lie groups Eberlein, Patrick |
locus with multiplicities of a geodesic ... |
... Keywords and Phrases Introduction Classical |
Conjugate
Performance Profiles of Conjugate-Gradient Algorithms for Unconstrained Optimization Performance Profiles of Conjugate-Gradient Algorithms for Unconstrained Optimization Andrei, Neculai |
-Gradient Algorithms Hybrid ... |
... algorithm to compute the Legendre–Fenchel |
conjugate
Computing the conjugate of convex piecewise linear-quadratic bivariate functions Computing the conjugate of convex piecewise linear-quadratic bivariate functions Gardiner, Bryan; Lucet, Yves |
of convex piecewise linear-quadratic (PLQ) ... |
... Two birational isomorphic G-surfaces define |
conjugate
Finite Subgroups of the Plane Cremona Group Finite Subgroups of the Plane Cremona Group Dolgachev, Igor V.; Iskovskikh, Vasily A. |
subgroups of Cr(2), and conversely, a ... |
... {S}^1)$$ Diff ( S 1 ) obtained are semi |
conjugate
Isometries of Lorentz surfaces and convergence groups Isometries of Lorentz surfaces and convergence groups Monclair, Daniel |
to subgroups of finite covers of $$\mathrm ... |
... matrices over $\mathcal{U}$ which are |
conjugate
Path Methods for Strong Shift Equivalence of Positive Matrices Path Methods for Strong Shift Equivalence of Positive Matrices Boyle, Mike; Kim, K. H.; Roush, F. W. |
over $\mathcal{U}$ to a given matrix, there ... |
... then one can ask whether w is G(k)- |
conjugate
Cocharacter-closure and the rational Hilbert–Mumford Theorem Cocharacter-closure and the rational Hilbert–Mumford Theorem Bate, Michael; Herpel, Sebastian; Martin, Benjamin; Röhrle, Gerhard |
to v. ... |
... and Phrases Introduction New Hybrid |
Conjugate
New Hybrid Conjugate Gradient Algorithms for Unconstrained Optimization New Hybrid Conjugate Gradient Algorithms for Unconstrained Optimization Andrei, Neculai |
Gradient Algorithms The New Hybrid ... |
... [9, 11] provide a geometric model for |
conjugate
On conjugate elements in a semigroup and semigroup diagrams On conjugate elements in a semigroup and semigroup diagrams Cummings, Paul A.; Teymouri, Jamal |
pairs of elements in a group G given by a ... |
... of α, then the stabilizers of β and α are |
conjugate
Group Actions and Permutation Groups Group Actions and Permutation Groups Machì, Antonio |
. ... |
... techniques - the Hampath code - to compute |
conjugate
Geometric and numerical techniques to compute conjugate and cut loci on Riemannian surfaces Geometric and numerical techniques to compute conjugate and cut loci on Riemannian surfaces Bonnard, Bernard; Cots, Olivier; Jassionnesse, Lionel |
and cut loci on Riemannian surfaces using ... |
... the connections between envelopes and |
conjugate
The Calculus of Variations: A Historical Perspective The Calculus of Variations: A Historical Perspective Schättler, Heinz; Ledzewicz, Urszula |
points of a fold type and use these ... |
... and translation). Two maps are said to be |
conjugate
Conjugacy of Maps Conjugacy of Maps Layek, G. c. |
if they are equivalent to each other and ... |
... at time $$T = \frac{\pi } {2}$$ . This is a |
conjugate
Control-Affine Systems in Low Dimensions: From Small-Time Reachable Sets to Time-Optimal Syntheses Control-Affine Systems in Low Dimensions: From Small-Time Reachable Sets to Time-Optimal Syntheses Schättler, Heinz; Ledzewicz, Urszula |
point to the origin, and it is no longer ... |
... whether two given matrices are integer |
conjugate
Gauss Reduction in Higher Dimensions Gauss Reduction in Higher Dimensions Karpenkov, Oleg |
, but to distinguish conjugacy classes is a ... |
... (\nu ,n-\nu )$$ S O ∘ ( ν , n - ν ) is |
conjugate
Singular Orbits in Cohomogeneity One Pseudo-Euclidean Space $$\mathbb {R}^4_\nu $$${\mathbb{R}}_{\mathit{\nu}}^{4}$ Singular Orbits in Cohomogeneity One Pseudo-Euclidean Space $$\mathbb {R}^4_\nu $$${\mathbb{R}}_{\mathit{\nu}}^{4}$ Ahmadi, P. |
to $$SO(\nu )\times SO(n-\nu )$$ S O ( ν ) ... |
... curve can be defined, which we call the |
conjugate
The distance trisector curve is transcendental The distance trisector curve is transcendental Monterde, J.; Ongay, F. |
distance trisector curve, or simply, the ... |
... lattice and its automorphism which is not |
conjugate
Automorphisms of Niemeier lattices for Miyamoto’s $${\mathbb {Z}}_3$$${\mathbb{Z}}_{3}$-orbifold construction Automorphisms of Niemeier lattices for Miyamoto’s $${\mathbb {Z}}_3$$${\mathbb{Z}}_{3}$-orbifold construction Ishii, Motohiro; Sagaki, Daisuke; Shimakura, Hiroki |
to any of the $$\sigma _{1},\,\ldots ... |