Results 301 to 310 of about 33,778 (318)

Linearized boundary control method for density reconstruction in acoustic wave equations. [PDF]

Inverse Probl
Oksanen L, Yang T, Yang Y.
europepmc   +1 more source

Magnetic Flatness and E. Hopf's Theorem for Magnetic Systems. [PDF]

Commun Math Phys
Assenza V, Marshall Reber J, Terek I.
europepmc   +1 more source

Influence of High-frequency Yoga Breathing (Kapalabhati) on States Changes in Gamma Oscillation. [PDF]

Int J Yoga
Budhi RB, Singh D, Goswami J, Manjunath NK, Vinchurkar S.   +4 more
europepmc   +1 more source

Vulnerability Analysis Method Based on Network and Copula Entropy. [PDF]

Entropy (Basel)
Chen M, Liu J, Zhang N, Zheng Y.
europepmc   +1 more source

Geodesics and Almost Geodesics Curves [PDF]

Results in Mathematics, 2018
We determine in $$\mathbb {R}^n$$ the form of curves $$\mathcal C$$
Olga Belova, Josef Mikeš, Karl Strambach   +2 more
openaire   +1 more source

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Geodesic patterns

ACM SIGGRAPH 2010 papers, 2010
Geodesic curves in surfaces are not only minimizers of distance, but they are also the curves of zero geodesic (sideways) curvature. It turns out that this property makes patterns of geodesics the basic geometric entity when dealing with the cladding of a freeform surface with wooden panels which do not bend ...
Pottmann, Helmut, Huang, Qixing, Deng, Bailin, Schiftner, Alexander, Kilian, Martin, Guibas, Leonidas J., Wallner, Johannes   +6 more
openaire   +5 more sources

Geodesics on S 3 [PDF]

, 1997
In this chapter we study the geodesic vector field on the tangent bundle of the 3-sphere. We examine its relation to the Kepler vector field, which governs the motion of two bodies in R 3 under gravitational attraction. We give two methods to regularize the flow of the Kepler vector field: one energy surface by energy surface and the other for all ...
Larry Bates, Richard Cushman
openaire   +2 more sources

Geodesic as Limit of Geodesics on PL-Surfaces

2008
We study the problem of convergence of geodesics on PL-surfaces and in particular on subdivision surfaces. More precisely, if a sequence (Tn)n∈N of PL-surfaces converges in distance and in normals to a smooth surface S and if Cn is a geodesic of Tn (i.e.
Lieutier, André, Thibert, Boris
openaire   +3 more sources