Difference between revisions of "Diffeomorphism"

differentiable homeomorphism, smooth homeomorphism

A one-to-one continuously-differentiable mapping $ f : M \rightarrow N $ of a differentiable manifold $ M $( e.g. of a domain in a Euclidean space) into a differentiable manifold $ N $ for which the inverse mapping is also continuously differentiable. If $ f ( M) = N $, one says that $ M $ and $ N $ are diffeomorphic. From the point of view of differential topology, diffeomorphic manifolds have the same properties, and one is interested in a classification of manifolds up to a diffeomorphism (this classification is not identical with the coarser classification up to a homeomorphism, except for cases involving small dimensions).

Even though the term "diffeomorphism" was introduced comparatively recently, in practice numerous transformations and changes of variables which have been used in mathematics for long periods of time are diffeomorphisms, while many families of transformations are groups of diffeomorphisms. This applies, in particular, to diffeomorphisms which preserve a supplementary structure on the manifold (e.g. a contact, symplectic, conformal, or complex structure). In the past such diffeomorphisms had special appellations (in the above examples, contact transformations, canonical mappings, conformal mappings, and biholomorphic mappings), and these are often replaced at the time of writing (1970s) by the term "diffeomorphism" with an adjective characterizing the preserved structure (e.g. "symplectic diffeomorphismsymplectic diffeomorphism" rather than "canonical transformation" ).

Topological (more exactly, homotopic) properties of the group $ \mathop{\rm Diff} M $ of all diffeomorphisms of a manifold $ M $ onto itself, in which a topology has been introduced in a suitable manner, have also been studied. They may be unexpectedly complicated (see, e.g., [1], [4], [5], which also contain reviews and references). This problem is connected with a number of important problems in homotopic topology (e.g. with the homotopy groups of spheres). In principle, knowledge of the properties of $ \mathop{\rm Diff} M $ would be of assistance in solving these problems, but at the time of writing (1987) the situation seems to be almost the opposite: Advances in the study of $ \mathop{\rm Diff} M $ involve the use of the already known features of the problems or, at best, are realized in parallel with the solutions of these problems and by the same methods. As regards the algebraic properties of the group of diffeomorphisms of class $ C ^ {r} $( including the case $ r = \infty $) of a closed $ n $- dimensional manifold, it has been proved that if $ r \neq n + 1 $, then its connected component of the unit is a simple group, i.e. has no non-trivial normal subgroups (see Normal subgroup; cf. [2], ; the situation is not clear for $ r = n + 1 $). As regards a non-closed $ n $- dimensional manifold $ M $, it has been proved that the group of all diffeomorphisms of class $ C ^ {r} $( $ r \neq n + 1 $) which may be connected with the identity mapping $ 1 _ {M} $ by way of a continuous family of diffeomorphisms $ f _ {t} $( $ 0 \leq t \leq 1 $, $ f _ {0} = 1 _ {M} $; $ f _ {1} = f $) which does not displace points outside a certain compact set (depending on the family), is simple.

References

Comments

The diffeomorphism classification of compact two-dimensional manifolds is presented in [a1]. For manifolds of dimensions three or fewer the classification by diffeomorphism, homeomorphism and combinatorial equivalence coincide; see [a5], [a6]. For compact simply-connected manifolds $ M _ {1} , M _ {2} $ of dimension $ n \geq 5 $ one of the most useful tools for obtaining a diffeomorphism is the $ h $- cobordism theorem of Smale [a7], see also [a4]: $ M _ {1} $ and $ M _ {2} $ are diffeomorphic provided there is a compact manifold $ N $ of dimension $ n + 1 $ whose boundary is the disjoint union $ M _ {1} \cup M _ {2} $, and both $ M _ {1} $ and $ M _ {2} $ are deformation retracts of $ N $( cf. Deformation retract; $ h $- cobordism). In fact, in this case $ N $ is diffeomorphic to the Cartesian product of $ M _ {1} $( or $ M _ {2} $) and the closed unit interval.

Many further results have been obtained by combining the $ h $- cobordism theorem with other tools from algebraic and differential topology; see [a1], [a3].

References

[a1]	W.B. Browder, "Surgery on simply-connected manifolds" , Springer (1972) MR0358813 Zbl 0239.57016
[a2]	M.W. Hirsch, "Differential topology" , Springer (1976) pp. Chapt. 6 MR0448362 Zbl 0356.57001
[a3]	R.C. Kirby, L.C. Siebenmann, "Foundational essays on topological manifolds, smoothings, and triangulations" , Princeton Univ. Press (1977) pp. 155–213 MR0645390 Zbl 0361.57004
[a4]	J. Milnor, "Lecture notes on the -cobordism theorem" , Princeton Univ. Press (1965) MR190942
[a5]	E.E. Moise, "Geometric topology in dimensions 2 and 3" , Springer (1977) MR0488059 Zbl 0349.57001
[a6]	J. Munkres, "Obstructions to smoothing of piecewise-differentiable homeomorphisms" Ann. of Math. , 72 (1960) pp. 521–554 MR121804 Zbl 0108.18101
[a7]	S. Smale, "On the structure of manifolds" Amer. J. Math. , 84 (1962) pp. 387–399 MR0153022 Zbl 0109.41103 Zbl 0101.16103