A (244,323)-configuration on the Schur quartic with logarithmic Chern slope 14/5
Abstract
Let X⊂P3 be the Schur quartic \[ x04-x0x13-x24+x2x33=0. \] We exhibit a connected arrangement of 24 lines on X, defined over Q(-3), whose singular locus consists of 32 ordinary triple points and no other intersections. Each line contains four triple points. The resulting reduced divisor D satisfies D6H, where H is the hyperplane class. If π:Y X blows up the triple points and B=(π-1D)red, then \[ c12(Y,B)=112, c2(Y,B)=40, c12(Y,B)c2(Y,B)=145. \] This gives a negative answer to the K3-surface specialization of the proposed 8/3 bound for transversal arrangements of rational curves. The configuration is one half of the 48 lines of the second kind on X; an explicit projective automorphism exchanges the two halves. We deliver the line parametrizations and all 32 triple-point coordinates. Ancillary exact-arithmetic data record the 120 line-containment coefficients and all 276 pair-incidence determinants. A finite-field mixed-integer search is described only as the discovery procedure and is not used in the proof.
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