Crosscap number

In the mathematical field of knot theory, the crosscap number of a knot K is the minimum of

1 - \chi(S), \,

taken over all compact, connected, non-orientable surfaces S bounding K; here \chi is the Euler characteristic. The crosscap number of the unknot is zero, as the Euler characteristic of the disk is one.

Examples

The formula for the knot sum is

C(k_1)+C(k_2)-1 \leq C(k_1 \# k_2) \leq C(k_1)+C(k_2). \,

Further reading

External links

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