23/12/23 10:10:10.36 CO6RHQhW.net
>>745
>>手持ちの「4次元多様体 I&II 上正明・松本 幸夫(著) 2022年02月版」を調べるべきだし
>その本にはノビコフの定理の証明はもちろん、ステートメントも書いてない
>要するに、そこはもう松本幸夫氏の「4次元のトポロジー」に書かれてる通りだから
ちがう!
・えーと>>739より再録
(参考)
URLリンク(en.wikipedia.org)
Classification of manifolds
Dimension 4: exotic
Further information: 4-manifold
Four-dimensional manifolds are the most unusual: they are not geometrizable (as in lower dimensions), and surgery works topologically, but not differentiably.
Since topologically, 4-manifolds are classified by surgery, the differentiable classification question is phrased in terms of "differentiable structures": "which (topological) 4-manifolds admit a differentiable structure, and on those that do, how many differentiable structures are there?"
Four-manifolds often admit many unusual differentiable structures, most strikingly the uncountably infinitely many exotic differentiable structures on R4. Similarly, differentiable 4-manifolds is the only remaining open case of the generalized Poincaré conjecture.
Dimension 5 and more: surgery
Further information: surgery theory
In dimension 5 and above (and 4 dimensions topologically), manifolds are classified by surgery theory.
The reason for dimension 5 is that the Whitney trick works in the middle dimension in dimension 5 and more: two Whitney disks generically don't intersect in dimension 5 and above,