We study outer Lipschitz geometry of real semialgebraic or, more general, definable in a polynomially bounded o-minimal structure over the reals, circular surface germs, i.e., surfaces which link is homeomorphic to $S^1$. In particular, we show there are finitely many canonical Lipschitz invariant basic building blocks for the space of all arcs in those surfaces, called "segments" and "nodal zones". We also investigate and determine some necessary and sufficient conditions on such a surface so that it can be reduced to a H\"older triangle which shares with this surface almost the same Lipschitz invariant building blocks.
Comment: arXiv admin note: substantial text overlap with arXiv:2101.02302