Complexity of exotic R4's
A smooth manifold which is homeomorphic but not diffeomorphic to R4 is called an exotic R4 . In this paper we construct several examples of such spaces, and define a notion of complexity for smooth manifolds homeomorphic to R4 . In particular, for R homeomorphic to R4 , we define the comple...
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ndltd-RICE-oai-scholarship.rice.edu-1911-194962013-10-23T04:14:38ZComplexity of exotic R4'sGanzell, SanfordMathematicsA smooth manifold which is homeomorphic but not diffeomorphic to R4 is called an exotic R4 . In this paper we construct several examples of such spaces, and define a notion of complexity for smooth manifolds homeomorphic to R4 . In particular, for R homeomorphic to R4 , we define the complexity, m(R), to be the supremum, taken over all compact codimension zero submanifolds K of R, of the minimal first betti number of any smooth 3-manifold Sigma3 which separates K from infinity, i.e., mR=sup K&parl0;min S&parl0;b1&parl0;S&parr0; &parr0;&parr0;∈0,1,2,&ldots;,infinity . Examples are given, and various upper and lower bounds for complexity are computed. We also extend a result of Bizaca and Etnyre by showing how end summing with exotic R4 's of increasing complexity can be used to construct infinitely many smooth structures on any open 4-manifold with at least one topologically collarable end, i.e., an end homeomorphic to Sigma3 x R for some closed 3-manifold Sigma3.Strong, Richard2009-06-04T08:46:58Z2009-06-04T08:46:58Z2000ThesisText36 p.application/pdfhttp://hdl.handle.net/1911/19496eng |
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NDLTD |
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English |
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Others
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Mathematics |
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Mathematics Ganzell, Sanford Complexity of exotic R4's |
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A smooth manifold which is homeomorphic but not diffeomorphic to R4 is called an exotic R4 . In this paper we construct several examples of such spaces, and define a notion of complexity for smooth manifolds homeomorphic to R4 . In particular, for R homeomorphic to R4 , we define the complexity, m(R), to be the supremum, taken over all compact codimension zero submanifolds K of R, of the minimal first betti number of any smooth 3-manifold Sigma3 which separates K from infinity, i.e., mR=sup K&parl0;min S&parl0;b1&parl0;S&parr0; &parr0;&parr0;∈0,1,2,&ldots;,infinity . Examples are given, and various upper and lower bounds for complexity are computed. We also extend a result of Bizaca and Etnyre by showing how end summing with exotic R4 's of increasing complexity can be used to construct infinitely many smooth structures on any open 4-manifold with at least one topologically collarable end, i.e., an end homeomorphic to Sigma3 x R for some closed 3-manifold Sigma3. |
| author2 |
Strong, Richard |
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Strong, Richard Ganzell, Sanford |
| author |
Ganzell, Sanford |
| author_sort |
Ganzell, Sanford |
| title |
Complexity of exotic R4's |
| title_short |
Complexity of exotic R4's |
| title_full |
Complexity of exotic R4's |
| title_fullStr |
Complexity of exotic R4's |
| title_full_unstemmed |
Complexity of exotic R4's |
| title_sort |
complexity of exotic r4's |
| publishDate |
2009 |
| url |
http://hdl.handle.net/1911/19496 |
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AT ganzellsanford complexityofexoticr4s |
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1716611102163337216 |