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1. Of all genus 2 hyperbolic surfaces, the Bolza surface has the highest systole.^[1]
2. The Fuchsian group defining the Bolza surface is also a subgroup of the (3,3,4) triangle group, which is a subgroup of index 2 in the (2,3,8) triangle group.^[1]
3. Of all genus 2 {\displaystyle 2} hyperbolic surfaces, the Bolza surface maximizes the length of the systole (Schmutz 1993).^[2]
4. The Bolza surface is a ( 2 , 3 , 8 ) {\displaystyle (2,3,8)} triangle surface – see Schwarz triangle.^[2]
5. The first eigenspace (that is, the eigenspace corresponding to the first positive eigenvalue) of the Bolza surface is three-dimensional, and the second, four-dimensional (Cook 2018), (Jenni 1981).^[2]
6. In particular, the spectrum of the Bolza surface is known to a very high accuracy (Strohmaier & Uski 2013).^[2]
7. To the best of our knowledge, there is no available software for the simplest possible extension, i.e., the Bolza surface, a hyperbolic manifold homeomorphic to a torus of genus two.^[3]
8. We consider generalized Bolza surfaces Mg, where the octagon is replaced by the regular 4g-gon, leading to a genus g surface.^[4]
9. The Bolza surface is a hyperbolic closed compact orientable surface.^[5]
10. A triangulation of the Bolza surface can be seen as a periodic triangulation of the hyperbolic plane.^[5]
11. The Bolza surface \(\mathcal{M}\) is defined as the quotient of \(\mathbb H^2\) under the action of a group \(\mathcal G\) that we will introduce now.^[5]
12. Figure 44.2 Topological construction of a genus-2 surface from the original domain \(\mathcal D\) of the Bolza surface.^[5]
13. I. Iordanov & M. Teillaud Implementing Delaunay triangulations of the Bolza surface 9 / 33 qXaba(q)ab(q)XbThe Bolza Surface Bolza surface What is it?^[6]
14. (cid:73) Explicit solutions are known on H2 and also on the hyperbolic Bolza surface of genus 2 (Maldonado and NSM).^[7]
15. The algorithm is used to compute the motion of a vortex on the Bolza surface.^[8]
16. The numerical results show that all the 46 vortex equilibria can be explicitly computed using the symmetries of the Bolza surface.^[8]
17. In §4, the algorithm of §2 and the results in §3 are applied to the Bolza surface.^[8]
18. The Bolza surface admits a regular octagonal tiling.^[9]
19. (cid:73) N = 2 Bradlow vortices with separated vortex centres should arise from generic holomorphic 1-forms on the Bolza surface, and the Baptista metric is ||2.^[10]
20. Bolza surface double covers the Riemann sphere.^[10]
21. We give a detailed description of the arithmetic Fuch- sian group of the Bolza surface and the associated quaternion or- der.^[11]
22. However, this congruence subgroup has torsion: it contains an involution closely related to the hyperelliptic involution of the Bolza surface (see Sec- tion 11).^[11]
23. i = SL2(F3), explaining some of the over, we show that symmetries of the Bolza surface.^[11]
24. In particular, we focus on the Bolza surface and the Klein quartic.^[12]
25. Thus, among all CAT(0) metrics, the one with the best systolic ratio is composed of six at regular octagons centered at the Weierstrass points of the Bolza surface.^[13]
26. The inequality is saturated by a singular at metric, with 16 conical singularities, in the conformal class of the Bolza surface.^[13]
27. METRICS IN GENUS TWO 97 The Bolza surface is described in Section 2.^[13]
28. The Bolza surface is also conjectured to be extremal for the rst eigenvalue of the Laplacian.^[13]
29. Distinguishing 16 points on the Bolza surface 3.^[14]
30. (1.1) The inequality is saturated by a singular at metric, with 16 conical singularities, in the conformal class of the Bolza surface.^[14]
31. The Bolza surface is described in Section 2.^[14]
32. The Bolza surface satises SR( ) B Note that Theorems 2.3 and 1.3 imply that SR( B ) 3 .^[14]

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• [{'LOWER': 'bolza'}, {'LEMMA': 'surface'}]