First Hurwitz triplet theory of Riemann surfaces , the first Hurwitz triplet is a triple of distinct Hurwitz surfaces with the identical automorphism group of the lowest possible genus, namely 14. The explanation for this phenomenon is arithmetic. Namely, in the ring of integers of the appropriate number field , the rational prime 13 splits as a product of three distinct prime ideals . The principal congruence subgroups defined by the triplet of primes produce Fuchsian groups corresponding to the triplet of Riemann surfaces.Arithmetic construction Let be the real subfield of where is a 7th-primitive root of unity . The ring of integers of K is, where. Let be the quaternion algebra , or symbol algebra. Also Let and. Let. Then is a maximal order of , described explicitly by Noam Elkies .order to construct the first Hurwitz triplet, consider the prime decomposition of 13 in, namely factors . The principal congruence subgroup defined by such a prime ideal I is by definition the groupreduced norm 1 in equivalent to 1 modulo the ideal . The corresponding Fuchsian group is obtained as the image of the principal congruence subgroup under a representation to PSL.Fuchsian model , the quotient of the hyperbolic plane by one of these three Fuchsian groups.Bound for systolic length and the systolic ratio The Gauss–Bonnet theorem states that Euler characteristic of the surface and is the Gaussian curvature . In the case we havelower bound on the systole as specified in , namely reduced trace of an element in the corresponding subgroup. The systolic ratio is the ratio of the square of the systole to the area.Ideal Systole 5.9039 Systolic Trace Systolic Ratio 0.2133 Number of Systolic Loops 91
Ideal Systole 6.3933 Systolic Trace Systolic Ratio 0.2502 Number of Systolic Loops 78
Ideal Systole 6.8879 Systolic Trace Systolic Ratio 0.2904 Number of Systolic Loops 364
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