Search results for "Complex lamellar vector field"

showing 5 items of 5 documents

A method of desingularization for analytic two-dimensional vector field families

1991

It is well known that isolated singularities of two dimensional analytic vector fields can be desingularized: after a finite number of blowing up operations we obtain a vector field that exhibits only elementary singularities. In the present paper we introduce a similar method to simplify the periodic limit sets of analytic families of vector fields. Although the method is applied here only to reduce to families in which the zero set has codimension at least two, we conjecture that it can be used in general. This is related to the famouss Hibert's problem about planar vector fields.

Vector calculus identitiesCurl (mathematics)Solenoidal vector fieldVector operatorGeneral MathematicsMathematical analysisFundamental vector fieldDirection vectorComplex lamellar vector fieldMathematicsVector potentialBoletim da Sociedade Brasileira de Matem�tica
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Volume, energy and generalized energy of unit vector fields on Berger spheres: stability of Hopf vector fields

2005

We study to what extent the known results concerning the behaviour of Hopf vector fields, with respect to volume, energy and generalized energy functionals, on the round sphere are still valid for the metrics obtained by performing the canonical variation of the Hopf fibration.

Curl (mathematics)Vector calculus identitiesSolenoidal vector fieldUnit vectorGeneral MathematicsMathematical analysisFundamental vector fieldVector fieldComplex lamellar vector fieldMathematicsVector potentialProceedings of the Royal Society of Edinburgh: Section A Mathematics
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Finite element approximation of vector fields given by curl and divergence

1981

In this paper a finite element approximation scheme for the system curl is considered. The use of pointwise approximation of the boundary condition leads to a nonconforming method. The error estimate is proved and numerically tested.

PointwiseCurl (mathematics)Vector operatorApproximation errorGeneral MathematicsMathematical analysisGeneral EngineeringMixed finite element methodComplex lamellar vector fieldMathematicsVector potentialExtended finite element methodMathematical Methods in the Applied Sciences
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Vectors and Vector Fields

2012

The purpose of this book is to explain in a rigorous way Stokes’s theorem and to facilitate the student’s use of this theorem in applications. Neither of these aims can be achieved without first agreeing on the notation and necessary background concepts of vector calculus, and therein lies the motivation for our introductory chapter.

AlgebraSolenoidal vector fieldStandard basisPhysics::Physics EducationVector fieldCross productDirection vectorVector calculusComplex lamellar vector fieldCauchy–Schwarz inequalityMathematics
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Minimal unit vector fields

2002

We compute the first variation of the functional that assigns each unit vector field the volume of its image in the unit tangent bundle. It is shown that critical points are exactly those vector fields that determine a minimal immersion. We also find a necessary and sufficient condition that a vector field, defined in an open manifold, must fulfill to be minimal, and obtain a simpler equivalent condition when the vector field is Killing. The condition is fulfilled, in particular, by the characteristic vector field of a Sasakian manifold and by Hopf vector fields on spheres.

Curl (mathematics)Killing vector fieldsSolenoidal vector fieldVector operatorcritical pointsGeneral Mathematicsminimal vector fieldsMathematical analysis53C4253C20Hopf vector fields53C25Sasakian manifoldsKilling vector fieldUnit vectorFundamental vector fieldMathematics::Differential GeometryVolume of vector fieldsComplex lamellar vector fieldVector potentialMathematicsTohoku Mathematical Journal
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