Research & Reviews: Discrete Mathematical Structures:

Sum or integrals over discrete or continuous topological indices respectively. An analytic formalism is developed for the spectrum of discrete indices that can be completed into a continuum and continuous indices.

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Simon Davis. Discrete and Continuous Indices. Research & Reviews: Discrete Mathematical Structures. 2015; 2(2): 25–37p.

Boone WW, Haken W, Poenaru P. On Recursively Unsolvable Problems in Topology and their Classification. In: H. Arnold Schmidt, Schutte, K., Thiele, H.-J., eds. Cont. to Math. Logic; 1966; Proc. Logic Colloquium; August, 1966; Hanover. Amsterdam: North-Holland; 1968: 37–38p.

Mandelbaum R. Four-Dimensional Topology: An Introduction, Bull. Amer. Math. Soc. 2008; 2: 1–159p.

Gelfand IM, Raikov, Silov GE. Commutative Normed Rings. Moscow: Gosudarstv. Izdat. Fiz.-Mat. Lit. 1960: 316p.

Akemann CA. A Gelfand Representation Theory for C Algebras. Pac. J. Math. 1971; 39: 1–11p.

Reinhart BL, Wood JW. A Metric Formula for the Godbillon-Vey Invariant for Foliations. Proc. Amer. Math. Soc. 1972; 38: 427–4p.

Godbillon C, Vey G. Un Invariant des Feuillet´ages de Codimension 1. C. R. Acad. Sci. Paris. 1971; 273: 92–4p.

Hurder S. Dynamics and the Godbillon-Vey Class. A History and Survey, In: Walczak, P., Conlon, L., Langevin, R., Tsuboi, T. Foliations: Geometry and Dynamics. Proc. Euroworkshop; 29 May - 9 June, 2000; Warsaw. ingapore: World Scientific; 2002: 29–34p.

Meyerhoff R, Rubermann D. Mutation and η-Invariant. J. Diff. Geom. 1990; 31: 101-29p.

Consani C, Marcolli M. Spectral Triples from Mumford Curves. Int. Math. Res. No- tices. 2003; 36: 1945–28p.

Serre J-P. Topics in Galois Theory. Wellesley: A. K. Peters. 2007: 120p.

Groenewegen R. Arithmetic Analogues of Theorems for Curves, In: XXI Journ´ees Arithmetiques; 12-16 July, 1999; Pontificia Universitas Lateranensis. J. de Th´eorie des Nombres de Bordeaux. 2001; 13(1): 143–14p.

van der Geer G, Schoof R. Effectivity of Arakelov Divisors and the Theta divisor of a Number Field. Math. 9802021.

Guardia J. Geometrica aritm`etica en una familia de corbes de g´enera 3, Univ. Barcelona Thesis, 1998.

Neumann H. Arithmetic Invariants of Hyperbolic Manifolds, In: Champanerkar, A. Dasbach, O. Kalfagianni, E. Kofman, I. Neumann, W. Stoltsfux, N. eds. Interactions Between Hyperbolic Geometry, Quantum Topology and Number Theory. June, 2009; Columbia University, New York. Contemporary Math,. Providence; American Mathematical Society; 2011; 541: 233–15p.

Hilden HM, Lozano, MT, Montesuma-Amilibia, JM. On Volumes and Chern-Simons Invariants of Geometric 3-Manifolds. J. Math. Sciences Tokyo. 1998; 3: 723–22p.

Kotschick D. Godbillon-Vey Invariants for Families of Foliations. Math. GT/0111137.

Barreira L, Silva C. Lyapunov Exponents for Continuous Transformations and Dimension Theory, Discrete and Continuous Dynamical Systems - Series A. 2005; 13: 469–21p.

Satake I. On a Generalization of the Notion of a Manifold. Proc. Nat. Acad. Sci. U.S.A. 1956; 42: 359–5p.

Moerdijkm I, Reyes GE. Models for Smooth Infinitesimal Analysis. New York: Springer-Verlag. 1991; 402p.

Kock A. Synthetic Differential Geometry, L.M.S. Lecture Notes 333. Cambridge: Cambridge University Press; 2006. 233p.

Spivak DI. Derived Smooth Manifolds. Duke Math. J. 2010; 153: 55–74p.

Connes A. Geometry from the Spectral Point of View, Lett. Math. Phys. 1995; 34: 203–6p.

Cornelissen G, Marcolli M. Zeta Functions that hear the shape of a Riemann Surface. J. Geom. Phys. 2008; 58: 619–24p.