The realization space of a certain conic line arrangement of degree 7 and a π1-equivalent Zariski pair
Abstract
In this paper, we continue the study of the embedded topology of plane algebraic curves. We study the realization space of conic line arrangements of degree 7 with certain fixed combinatorics and determine the number of connected components. This is done by showing the existence of a Zariski pair having these combinatorics, which we identified as a π1-equivalent Zariski pair.
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