Home

curs Deformare a stabilit generic linear systems for projective cr manifolds construcții navale Nu o face Prezice

On maps of CR manifolds and transformations of differential equations
On maps of CR manifolds and transformations of differential equations

HOLOMORPHIC CURVES IN LORENTZIAN CR-MANIFOLDS
HOLOMORPHIC CURVES IN LORENTZIAN CR-MANIFOLDS

Robotics | Free Full-Text | Least Squares Optimization: From Theory to Practice | HTML
Robotics | Free Full-Text | Least Squares Optimization: From Theory to Practice | HTML

ON THE PROJECTIVE NORMALITY OF SOME VARIETIES OF DEGREE 5
ON THE PROJECTIVE NORMALITY OF SOME VARIETIES OF DEGREE 5

A Generic CR-Manifold as an {e}-Structure
A Generic CR-Manifold as an {e}-Structure

Some Families of Local Systems Over Smooth Projective Varieties
Some Families of Local Systems Over Smooth Projective Varieties

Boundaries of varieties in projective manifolds
Boundaries of varieties in projective manifolds

Generic Systems of Co-Rank One Vector Distributions
Generic Systems of Co-Rank One Vector Distributions

PDF) Compact homogeneous Leviflat CR-manifolds
PDF) Compact homogeneous Leviflat CR-manifolds

arXiv:1311.5669v1 [math.CV] 22 Nov 2013
arXiv:1311.5669v1 [math.CV] 22 Nov 2013

Remarks on the rigidity of CR-manifolds
Remarks on the rigidity of CR-manifolds

PDF) Lefschetz pencil structures for 2-calibrated manifolds
PDF) Lefschetz pencil structures for 2-calibrated manifolds

arXiv:math/0312078v1 [math.AG] 3 Dec 2003
arXiv:math/0312078v1 [math.AG] 3 Dec 2003

Exponential rise of dynamical complexity in quantum computing through projections | Nature Communications
Exponential rise of dynamical complexity in quantum computing through projections | Nature Communications

Computing a projection operator onto the null space of a linear imaging operator: tutorial
Computing a projection operator onto the null space of a linear imaging operator: tutorial

PDF) Embeddability for Three-Dimensional CR-Manifolds
PDF) Embeddability for Three-Dimensional CR-Manifolds

The Boggess-Polking extension theorem for <Emphasis Type="Italic">CR </Emphasis> functions on manifolds wi
The Boggess-Polking extension theorem for <Emphasis Type="Italic">CR </Emphasis> functions on manifolds wi

Mathematics | Free Full-Text | The Kinematics of a Bipod R2RR Coupling between Two Non-Coplanar Shafts | HTML
Mathematics | Free Full-Text | The Kinematics of a Bipod R2RR Coupling between Two Non-Coplanar Shafts | HTML

Pisot Units, Salem Numbers, and Higher Dimensional Projective Manifolds with Primitive Automorphisms of Positive Entropy
Pisot Units, Salem Numbers, and Higher Dimensional Projective Manifolds with Primitive Automorphisms of Positive Entropy

Stable Manifold - an overview | ScienceDirect Topics
Stable Manifold - an overview | ScienceDirect Topics

Weak q-concavity conditions for CR manifolds | SpringerLink
Weak q-concavity conditions for CR manifolds | SpringerLink

On CR-Mappings Between Algebraic Cauchy-Riemann Manifolds and Separate Algebraicity for Holomorphic Functions
On CR-Mappings Between Algebraic Cauchy-Riemann Manifolds and Separate Algebraicity for Holomorphic Functions

Tangent Cauchy-Riemann Equations and the Yang-Mills, Higgs and Dirac Fields T°p(L)=heC : J?^r(P)b=<>> »=1,2,...,*}.
Tangent Cauchy-Riemann Equations and the Yang-Mills, Higgs and Dirac Fields T°p(L)=heC : J?^r(P)b=<>> »=1,2,...,*}.

The Generic Dimension of the Space of C<sup>1</sup> Splines of Degree d ≥ 8 on Tetrahedral Decompositions
The Generic Dimension of the Space of C<sup>1</sup> Splines of Degree d ≥ 8 on Tetrahedral Decompositions

Maximally homogeneous nondegenerate CR manifolds
Maximally homogeneous nondegenerate CR manifolds