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= Introduction = <ref name="Blo74"/> <ref name="Blo00"/> <ref name="Blo78"/> <ref name="Blo10"/> <ref name="Blo81"/> <ref name="Zag07"/> <ref name="Hut13"/> <math>\int A=B</math> = References = <references> <ref name="Blo74">Bloch, S.; ''<math>K_2</math> and algebraic cycles''. Ann. of Math. (2) 99 (1974), 349–379. </ref> <ref name="Blo00">Bloch, S.; ''Higher regulators, algebraic K-theory, and zeta functions of elliptic curves''. CRM Monograph Series, 11. American Mathematical Society, Providence, RI, 2000. x+97 pp.</ref> <ref name="Blo78">Bloch, S.; ''Applications of the dilogarithm function in algebraic K-theory and algebraic geometry''. Proceedings of the International Symposium on Algebraic Geometry (Kyoto Univ., Kyoto, 1977), pp. 103–114, Kinokuniya Book Store, Tokyo, 1978.</ref> <ref name="Blo10">Bloch, S.; ''Lectures on algebraic cycles''. Second edition. New Mathematical Monographs, 16. Cambridge University Press, Cambridge, 2010. xxiv+130 pp.</ref> <ref name="Blo81">Bloch, S.; ''The dilogarithm and extensions of Lie algebras''. Algebraic K-theory, Evanston 1980 (Proc. Conf., Northwestern Univ., Evanston, Ill., 1980), pp. 1–23, Lecture Notes in Math., 854, Springer, Berlin-New York, 1981. </ref> <ref name="Zag07">Zagier, D.; ''The dilogarithm function''. Frontiers in number theory, physics, and geometry. II, 3–65, Springer, Berlin, 2007. </ref> <ref name="Hut13">Hutchinson, K.; ''A Bloch-Wigner complex for <math>\mathrm{SL}_2</math>''. J. K-Theory 12 (2013), no. 1, 15–68. </ref> <ref name="Goe07">Goette, S.; Zickert, Ch. ''The extended Bloch group and the Cheeger-Chern-Simons class''. Geom. Topol. 11 (2007), 1623–1635. </ref> </references>
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