The normal Euler class and singularities of projections for polyhedral surfaces in 4-space (Q1378005)
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scientific article; zbMATH DE number 1113444
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | The normal Euler class and singularities of projections for polyhedral surfaces in 4-space |
scientific article; zbMATH DE number 1113444 |
Statements
The normal Euler class and singularities of projections for polyhedral surfaces in 4-space (English)
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5 February 1998
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The authors' summary: ``This paper defines the normal Euler number and the normal Euler class for polyhedral surfaces in 4-space by means of singularities of projections into hyperplanes. There exist polyhedral analogues of nearly all of Whitney's theorems on normal Euler classes of surfaces smoothly immersed in 4-space. However, although the normal Euler number of a smooth embedding of the real projective plane in 4-space must be plus or minus 2, the normal Euler number of a (locally knotted) polyhedral embedding of the real projective plane can be any integer congruent to 2 modulo 4''.
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polyhedral surface
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normal Euler class
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Whitney's theorems on normal Euler classes of surfaces smoothly immersed in 4-space
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