Extending periodic maps on surfaces over the 4-sphere

Abstract

Let Fg be the closed orientable surface of genus g. We address the problem to extend torsion elements of the mapping class group M(Fg) over the 4-sphere S4. Let wg be a torsion element of maximum order in M(Fg). Results including: (1) For each g, wg is periodically extendable over S4 for some non-smooth embedding e: Fg S4, and not periodically extendable over S4 for any smooth embedding e: Fg S4. (2) For each g, wg is extendable over S4 for some smooth embedding e: Fg S4 if and only if g=4k, 4k+3. (3) Each torsion element of order p in M(Fg) is extendable over S4 for some smooth embedding e: Fg S4 if either (i) p=3m and g is even; or (ii) p=5m and g 4k+2; or (iii) p=7m. Moreover the conditions on g in (i) and (ii) can not be removed .

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