Inter-universal Teichmuller Theory I: Construction of Hodge Theaters
Inter-universal Teichmuller Theory I: Construction of Hodge Theaters
Inter-universal Teichmuller Theory I: Construction of Hodge Theaters
Create successful ePaper yourself
Turn your PDF publications into a flip-book with our unique Google optimized e-Paper software.
INTER-UNIVERSAL TEICHMÜLLER THEORY I 155<br />
Bibliography<br />
[André] Y. André, On a Geometric Description <strong>of</strong> Gal(Q p /Q p )andap-adic Avatar <strong>of</strong><br />
ĜT , Duke Math. J. 119 (2003), pp. 1-39.<br />
[Asada] M. Asada, The faithfulness <strong>of</strong> the monodromy representations associated with<br />
certain families <strong>of</strong> algebraic curves, J. Pure Appl. Algebra 159 (2001), pp.<br />
123-147.<br />
[Falt] G. Faltings, Endlichkeitssätze für Abelschen Varietäten über Zahlkörpern, Invent.<br />
Math. 73 (1983), pp. 349-366.<br />
[FRS] B. Fine, G. Rosenberger, and M. Stille, Conjugacy pinched and cyclically<br />
pinched one-relator groups, Rev. Mat. Univ. Complut. Madrid 10 (1997), pp.<br />
207-227.<br />
[Groth] A. Grothendieck, letter to G. Faltings (June 1983) in Lochak, L. Schneps, Geometric<br />
Galois Actions; 1. Around Grothendieck’s Esquisse d’un Programme,<br />
London Math. Soc. Lect. Note Ser. 242, Cambridge Univ. Press (1997).<br />
[NodNon] Y. Hoshi, S. Mochizuki, On the Combinatorial Anabelian Geometry <strong>of</strong> Nodally<br />
Nondegenerate Outer Representations, Hiroshima Math. J. 41 (2011), pp. 275-<br />
342.<br />
[JP] K. Joshi and C. Pauly, Hitchin-Mochizuki morphism, opers, and Frobeniusdestabilized<br />
vector bundles over curves, preprint.<br />
[Kim] M. Kim, The motivic fundamental group <strong>of</strong> P 1 \{0, 1, ∞} and the theorem <strong>of</strong><br />
Siegel, Invent. Math. 161 (2005), pp. 629-656.<br />
[Lang] S. Lang, Algebraic number theory, Addison-Wesley Publishing Co. (1970).<br />
[Lehto]O.Lehto,Univalent Functions and Teichmüller Spaces, Graduate Texts in<br />
Mathematics 109, Springer, 1987.<br />
[PrfGC] S. Mochizuki, The Pr<strong>of</strong>inite Grothendieck Conjecture for Closed Hyperbolic<br />
Curves over Number Fields, J. Math. Sci. Univ. Tokyo 3 (1996), pp. 571-627.<br />
[pOrd] S. Mochizuki, A <strong>Theory</strong> <strong>of</strong> Ordinary p-adic Curves, Publ. Res. Inst. Math. Sci.<br />
32 (1996), pp. 957-1151.<br />
[pTeich] S. Mochizuki, Foundations <strong>of</strong> p-adic Teichmüller <strong>Theory</strong>, AMS/IP Studies<br />
in Advanced Mathematics 11, American Mathematical Society/<strong>Inter</strong>national<br />
Press (1999).<br />
[pGC] S. Mochizuki, The Local Pro-p Anabelian Geometry <strong>of</strong> Curves, Invent. Math.<br />
138 (1999), pp. 319-423.<br />
[HASurI] S. Mochizuki, A Survey <strong>of</strong> the <strong>Hodge</strong>-Arakelov <strong>Theory</strong> <strong>of</strong> Elliptic Curves I,<br />
Arithmetic Fundamental Groups and Noncommutative Algebra, Proceedings <strong>of</strong><br />
Symposia in Pure Mathematics 70, American Mathematical Society (2002),<br />
pp. 533-569.<br />
[HASurII] S. Mochizuki, A Survey <strong>of</strong> the <strong>Hodge</strong>-Arakelov <strong>Theory</strong> <strong>of</strong> Elliptic Curves II,<br />
Algebraic Geometry 2000, Azumino, Adv. Stud. Pure Math. 36, Math. Soc.<br />
Japan (2002), pp. 81-114.
Change language