TY - JOUR
T1 - An upper bound on distance degenerate handle additions
AU - Zou, Yanqing
N1 - Publisher Copyright:
©2024 American Society for Nondestructive Testing.
PY - 2023
Y1 - 2023
N2 - Let V ∪S W be a Heegaard splitting with a boundary component F. If r is an essential simple closed curve or a slope in F, then there is a Heegaard splitting V (r) ∪S W obtained by attaching a 2-handle along r on V. It was conjectured by Ma and Qiu that for almost all choices of r, the Heegaard distance d(V (r), W) is the same to d(V, W). By studying handle additions and local properties of the curve complex, we prove that if the distance of V ∪S W is at least 3, then there is a finite diameter ball in the curve complex C(F) so that it contains all distance degenerate curves or slopes in F. Together with a result proved by Lustig and Moriah, it gives an affirmative answer to Ma and Qiu’ conjecture.
AB - Let V ∪S W be a Heegaard splitting with a boundary component F. If r is an essential simple closed curve or a slope in F, then there is a Heegaard splitting V (r) ∪S W obtained by attaching a 2-handle along r on V. It was conjectured by Ma and Qiu that for almost all choices of r, the Heegaard distance d(V (r), W) is the same to d(V, W). By studying handle additions and local properties of the curve complex, we prove that if the distance of V ∪S W is at least 3, then there is a finite diameter ball in the curve complex C(F) so that it contains all distance degenerate curves or slopes in F. Together with a result proved by Lustig and Moriah, it gives an affirmative answer to Ma and Qiu’ conjecture.
UR - https://www.scopus.com/pages/publications/85199883865
U2 - 10.4310/CAG.2023.v31.n9.a2
DO - 10.4310/CAG.2023.v31.n9.a2
M3 - 文章
AN - SCOPUS:85199883865
SN - 1019-8385
VL - 31
SP - 2195
EP - 2226
JO - Communications in Analysis and Geometry
JF - Communications in Analysis and Geometry
IS - 9
ER -