Connections with Symplectic Structures

A charming feature of symplectic geometry is that it is at the crossroad of many other mathematical disciplines. In this article we review the basic notions with examples of symplectic structures and show the connections of symplectic geometry with the various branches of differential geometry using important theorems.


Introduction
Symplectic geometry originated in Hamiltonian dynamics.Symplectic geometry is the study of symplectic structures.These are certain topological structures, but these can only exist on even dimensional manifolds.Since symplectic structures are purely topological structures, they do not depend on any metric structure of the underlying space.
In the earlier work, Nazimuddin and Rifat (2014) developed a comparison between symplectic and Riemannian geometry [1].After summarizing the basic definitions, examples and facts concerning symplectic geometry, this article will proceed to discuss the connections between symplectic geometry and contact geometry, Riemannian geometry, Kähler geometry.

Basic Concepts with Examples
Let M be a even dimensional smooth closed manifold, that is a compact smooth manifold without boundary.A symplectic structure ω on M is a closed ( ) The nondegeneracy condition is equivalent to the fact that ω induces an isomorphism.In symplectic geometry, conformal changes to ω (i.e., multiplying by g) would usually force ( ) where ( ) , , , , , , , Example 2.2.All manifolds are not symplectic.For instance, S 4 is not.If ω 0 is a symplectic form on S 4 , then ω 0 is exact, since the second homology class of S 4 vanishes [2].In other words, since ω 0 is a closed 2-form 0 0 d ω α = , for some 1-form α 0 and ( ) Since S 4 has no boundary, the last integral vanishes and ω 0 can have no symplectic form.

Local Theory
The natural equivalence between symplectic structures is symplectomorphism.Two symplectic structures ω 1 and ω 2 on manifolds M 1 and M 2 , respectively, are symplectomorphic if there exists a diffeomorphism ϕ ω ω * = .All symplectic structures are locally symplectomorphic.In consequence, there are no local invariants in symplectic geometry according to the following theorems.In particular case, We have Darboux's theorem which states that, all symplectic structures on a 2n dimensional manifold are locally symplectomorphic to the standard structure on 2n  .
Theorem 3.1 (Darboux's theorem) Let M be a manifold of dimension 2n with a closed non-degenerate 2-form ω 0 .For any point p on a symplectic manifold, there exists a chart U with local coordinates ( ) , , , , , , , Theorem 3.2 (Weinstein's Theorem) If a submanifold L of a symplectic manifold (M, ω), then there exists a neighborhood of L which is symplectomorphic to a neighborhood of the zero section in the cotangent bundle T L * .Furthermore symplectic structures are "local in time".That is symplectic deformations of symplectic structures do not produce new symplectic structures.In particular, on a symplectic manifold all deformations of symplectic structures come from diffeomorphisms of the underlying manifold.The theorem is not true if the symplectic structures do not agree off of a compact set.

Existence and Classification
If a symplectic vector bundle is a pair (E, ω) over a smooth manifold M of rank 2n, where E → M is a real vector bundle, then ω q (skew-symmetric and non-degenerate) is a symplectic form on each fiber E q , depending smoothly on q.Each of the following two characteristics is equivalent to the existence of a symplectic structure (a) the existence of a reduction of the structure group of E from general linear group ( ) Sp 2 , n  and (b) the existence of an (almost) complex structure on ( ) In higher dimensions the uniqueness problem for symplectic forms on closed manifolds does not reduce to topological obstruction theory.There is often a dramatic difference between the space of non-degenerate two-forms and the space of symplectic forms [3].

Connections with Contact Geometry
The even dimensional analogue theory to contact geometry is symplectic geometry.In general, contact manifolds come naturally as boundaries of symplectic manifolds.Also a contact manifold by symplectic means by looking at its symplectization [4] [5].
Consider (X, ω) be a symplectic manifold.A vector field v satisfying where L v ω is the Lie derivative of ω in the direction of v, is called a symplectic dilation.
A compact hypersurface M in (X, ω) is said to have contact type if there exists a symplectic dilation v in a neighborhood of M that is transverse to M. Given a hypersurface M in (X, ω) the characteristic line field LM in the tangent bundle of M is the symplectic complement of TM in TX. (Since M is codimension one it is coisotropic and thus the symplectic complement lies in TM and is one dimensional.)Theorem 5.1.Let M be a compact hypersurface in a symplectic manifold (X, ω) and denote the inclusion map : i M X → .Then M has contact type if and only if there exists a 1-form α on M such that d i α ω * = and the form α is never zero on the characteristic line field.
If M is a hypersurface of contact type, then the 1-form α is obtained by contracting the symplectic dilation v into the symplectic form: It is easy to verify the 1-form α is a contact from on M. Thus a hypersurface of contact type in a symplectic manifold inherits a co-oriented contact structure.

0, X M
= × ∞ and given a global contact form α for ξ the symplectic form is ( ) , where t is the coordinate on  .Example 5.2.The symplectization of the standard contact structure on the unit cotangent bundle is the standard symplectic structure on the complement of the zero section in the cotangent bundle.
The symplectization is independent of the choice of contact from α.To see this fix a co-orientation for ξ and note the manifold X can be identified (in may ways) with the subbundle of T M * whose fiber over x M ∈ is { ( ) = and β > 0 on vectors positively transverse to ξ x } and restricting dλ the this subspace yields a symplectic form ω, where λ is the Liouville form on T M * .A choice of contact form α fixes an identification of X with the subbundle of T M * under which ( ) Thus we see that any co-orientable contact mani- fold can be realized as a hypersurface of contact type in a symplectic manifold.In summary we have the following theorem.
Theorem 5.3.If (M, ξ) is a co-oriented contact manifold, then there is a symplectic manifold Symp (M, ξ) in which M sits as a hypersurface of contact type.Moreover, any contact form α for ξ gives an embedding of M into Symp (M, ξ) that realizes M as a hypersurface of contact type.
We also note that all the hypersurfaces of contact type in (X, ω) look locally, in X, like a contact manifold sitting inside its symplectification.
Theorem 5.4.Given a compact hypersurface M of contact type in a symplectic manifold (X, ω) with the symplectic dilation given by v there is a neighborhood of M in X symplectomorphic to a neighborhood of M × {1} in Symp (M, ξ) where the symplectization is identified with The following proposition shows how symplectic structures can be generated from contact structures.There are also other relations between contact and symplectic geometry [7].

Connections with Riemannian Geometry
The differentiable structure of a smooth manifold M gives rise to a canonical symplectic form on its cotangent bundle T M * .Giving a Riemannian metric g on M is equivalent to prescribing its unit cosphere bundle g S M T M * * ⊂ and the restriction of the canonical 1-form from T M * gives S M * the structure of a contact manifold.
The following examples of known results are closely related to Riemannian and symplectic aspects of geometry.
1) A submanifold L of a symplectic manifold (M, ω) is called lagrangian if ω = 0 on TL.

S S S S × ⊂ ×
formed by the equators is also volume minimizing among its Hamiltonian deformations [10].If L is a closed Lagrangian submanifold of ( ) , n ω  there exists according to [11] a constant C depending on L such that Vol ( ) ( ) for all Hamiltonian deformations of L.
b) The mean curvature form of a Lagrangian submanifold L in a Kähler-Einstein manifold can be expressed through symplectic invariants of L [12].
2) To estimate the first eigenvalue of the Laplacian operator on functions for certain Riemannian manifolds, symplectic methods can be used [13].
3) Consider a bounded domain 2n U ⊂  with smooth boundary.There exists a pe- riodic billiard trajectory on U of length l with ( ) where C n is an explicit constant depending only on n [14].4) Also Jacobi identity sequence of the closure of the symplectic form, dω = 0.

Connections with Kähler Geometry
Kähler manifolds are the remarkable class of symplectic manifolds.M. Gromov [15] observed that some of the tools used in the Kähler context can be used for the study of symplectic manifolds.One part of his wondering work has grown into which is now called Gromov-Witten theory [16].All Kähler manifolds are symplectic, since the Kähler form is closed and non-degenerate For instance, the complex projective space n  is Kähler so that this space is also symplectic.But The converse need not be true, but we have the following theorem: Theorem 7.1.A structure (M, ω, J) on a smooth manifold X is a Kähler structure if ω is a symplectic form, J is a complex structure, g is a Riemannian metric such that Many techniques and constructions from complex geometry are most useful in symplectic geometry.For instance, there is a symplectic version of blowing-up, which is closely related to the symplectic packing problem [17] [18], also Donaldson's construction of symplectic submanifolds [19].
Also any complex surface admits a Kähler structure if and only if the first Betti number is even [20].There are many symplectic 4-manifolds with even b1 (or b1 = 0) admitting no Kähler structure [21].For a minimal Kähler surface we have the following theorem.
Theorem 7.2 Let (X, J) be a minimal Kähler surface.Then inside the symplectic cone, the Kähler cone can be enlarged across any of its open face determined by an irreducible curve with negative self-intersection.In fact, if the curve is not a rational curve with odd self-intersection, then the reflection of the Kähler cone along the corresponding face is in the symplectic cone.
In addition, for a minimal surface of general type, the canonical class K J is shown to be in the symplectic cone in [22] [23].

Conclusion
Symplectic geometry is a rather new and vigorously developing mathematical discipline.One can very roughly say that if the fundamental quantity in Riemannian geometry is length, then the fundamental quantity in symplectic geometry is directed area and the fundamental quantity in contact geometry is a certain twisting behavior.In this work, we have developed a connection between various branches of differential geometry with symplectic geometry.

Example 2 . 1 .
The standard symplectic structure on

∑
Thus locally all symplectic structures are symplectomorphic to Example 2.1.

Theorem 3 . 3 (
Moser's theorem) Let M be a closed manifold and ω t , of cohomologous symplectic forms on M then there is an isotopy t ϕ with Now we discuss some recent results on the existence of symplectic structures on both open and closed manifolds.The existence problem of symplectic structures on even dimensional closed manifolds is quite difficult.However, Gromov has shown that symplectic structures on open manifolds obey an h-principle rule.As the existence problem of symplectic structures is based on a differential equation, but it can be reduced to a differential inequality and then solved by the h-principle.Theorem 4.1 (Gromov's Theorem) Every 2n dimensional manifold M with almost symplectic structure is homotopic through almost symplectic structures to a symplectic structure, if M is open.If the manifolds are closed, then the existence problem is much more subtle.Often there are no h-principle rules.The following result was obtained using Seiberg-Witten theory: Theorem 4.2 (Taubes Theorem) The connected sum of an odd number of copies of 2  does not admit a symplectic structure (even though it admits an almost symplectic structure and a cohomology class

Proposition 5 . 5 . [ 6 ]∧
Let α be a contact structure on a 3-manifold.Then ( ) d e θ α is a symplectic form on the 4-dimensional manifold M ×  , where θ is the coordinate on  .(Here α is written as a form on M ×  ).Proof.We have is never zero and since d d α α∧does not contain differentials of θ, the claim follows.
a) Endow complex space n  with the usual Kähler metric and the usual Kähler form.The volume of submanifolds is taken with respect to this Riemannian metric.According to a result of Givental-Kleiner-Oh, the standard n  in n  has minimal volume among all its Hamiltonian deformations [8].A partial result for the Clifford torus in n  can be found in [9].The torus 1 1 2 2