Compression body

In the theory of 3-manifolds, a compression body is a kind of generalized handlebody.

A compression body is either a handlebody or the result of the following construction:

Let S {\displaystyle S} be a compact, closed surface (not necessarily connected). Attach 1-handles to S × [ 0 , 1 ] {\displaystyle S\times [0,1]} along S × { 1 } {\displaystyle S\times \{1\}} .

Let C {\displaystyle C} be a compression body. The negative boundary of C, denoted C {\displaystyle \partial _{-}C} , is S × { 0 } {\displaystyle S\times \{0\}} . (If C {\displaystyle C} is a handlebody then C = {\displaystyle \partial _{-}C=\emptyset } .) The positive boundary of C, denoted + C {\displaystyle \partial _{+}C} , is C {\displaystyle \partial C} minus the negative boundary.

There is a dual construction of compression bodies starting with a surface S {\displaystyle S} and attaching 2-handles to S × { 0 } {\displaystyle S\times \{0\}} . In this case + C {\displaystyle \partial _{+}C} is S × { 1 } {\displaystyle S\times \{1\}} , and C {\displaystyle \partial _{-}C} is C {\displaystyle \partial C} minus the positive boundary.

Compression bodies often arise when manipulating Heegaard splittings.

References

  • Bonahon, Francis (2002). "Geometric structures on 3-manifolds". In Daverman, Robert J.; Sher, Richard B. (eds.). Handbook of Geometric Topology. North-Holland. pp. 93–164. MR 1886669.