St. Petersburg Mathematical Journal, 18. cilt,1-510. sayfalarAmerican Mathematical Society, 2007 |
Kitabın içinden
34 sonuçtan 1-3 arası sonuçlar
Sayfa 245
... origin lies in the contact hyperplane , or it does not . 3.1.1 . The tangent space at the origin is transversal to the contact hyper- plane . First , we assume that the tangent space is transversal to the contact hyperplane . We apply ...
... origin lies in the contact hyperplane , or it does not . 3.1.1 . The tangent space at the origin is transversal to the contact hyper- plane . First , we assume that the tangent space is transversal to the contact hyperplane . We apply ...
Sayfa 246
... origin lies in the contact hyperplane . Now we consider the second possibility : we assume that the tangent space of the curve at the origin lies in the contact hyperplane . We project the curve to C2n with coordinates ( q , p ) . Since ...
... origin lies in the contact hyperplane . Now we consider the second possibility : we assume that the tangent space of the curve at the origin lies in the contact hyperplane . We project the curve to C2n with coordinates ( q , p ) . Since ...
Sayfa 250
... origin are equal to dz + p1dq1 or dz + pidqi + p2dq2 , while the exterior differentials of the forms at the origin are equal to dp1 Ʌ dq1 or dp1 ^ dq1 + dp2 ^ dq2 . In its turn , this means that the induced structures are contact ...
... origin are equal to dz + p1dq1 or dz + pidqi + p2dq2 , while the exterior differentials of the forms at the origin are equal to dp1 Ʌ dq1 or dp1 ^ dq1 + dp2 ^ dq2 . In its turn , this means that the induced structures are contact ...
İçindekiler
Auckly L Kapitanski and J M Speight Geometry and analysis | 1 |
R W Barnard C Richardson and A Yu Solynin A minimal area problem | 21 |
Generalov Hochschild cohomology of algebras of quaternion type | 37 |
Telif Hakkı | |
11 diğer bölüm gösterilmiyor
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algebra assume asymptotic Bellman function Bergman spaces Boltzmann weights boundary Chern classes coefficients cohomology colored commutative component condition configuration space conformal mapping consider contact Hamiltonian contact hyperplane contact space contact structure coordinate corresponding cubature cubature formula curve defined denote diagram differential Dirichlet domain elements embedding English transl equations estimate finite functor graph Hamiltonian Hochschild cohomology homogeneous homotopy hyperplane implies inequality integral invariant irreducible isomorphism lattice Lemma linear maps Math Mathematical matrix minimal monomial morphism multigerm multiplication norm normal form obtain operator orientation p₁ pair parameter polynomial problem projection Proof Proposition prove relations representation right change right-hand side RL-equivalent satisfies smooth varieties solution Subsection subspace symmetric tangent Theorem theory Toeplitz operators topology transversal u₁ V₁ vector bundle weight