Geometrische Ordnungen

“…Proof By the expansion and contraction theorems of Haupt and K~inneth [1], there is at least one E (a)-singular point s in [Zl,z2]. But zl, z2 are not E (a)-singular.…”

Normal arcs and curves of K-order k+1

“…Proof By the expansion and contraction theorems of Haupt and K~inneth [1], there is at least one E (a)-singular point s in [Zl,z2]. But zl, z2 are not E (a)-singular.…”

Normal arcs and curves of K-order k+1

“…In the analysis of such ~¢4's it will be necessary to include (2, 2) points ( [5], 2.1) as possible singular points as well as (1,3) and (3,1) points; (2, 2)-singular points are not possible if Condition I is satisfied ( [5], 2.2). The definition of such singular points on A4 is included for the convenience of the reader.…”

“…Let z be a singular point of an oriented arc ~ of cyclic order four. Then z is (1,3) [(3, 1); (2, 2)] singular, provided that for any two-sided neighbourhood L u (z} u M of z on ~¢4 there exists a circle which meets L and M once and three times [three times and once; twice each], respectively.…”

“…It is known that a strongly differentiable ( [3], 3.1) normal arc s¢4 of cyclic order four in the conformal plane contains at most four singular points ( [4], 3.6 and [1 ], 4.1.4.3). In [5] it is shown that a much weaker differentiability criterion--namely, Condition I ( [3], 1.5)--is sufficient to obtain four as the least upper bound for such arcs.…”

“…In [5] it is shown that a much weaker differentiability criterion--namely, Condition I ( [3], 1.5)--is sufficient to obtain four as the least upper bound for such arcs. Assuming no differentiability conditions, the best bound obtained so far is eleven ( [4] and [1], 4…”

A least upper bound for the number of singular points on normal arcs and curves of cyclic order four

Verschärfungen des Vierscheitelsatzes und ihre relativ‐geometrischen Verallgemeinerungen