RATIONAL PERIOD FUNCTIONS FOR P SL(2, Z) YJ. Choie and D. Zagier A rational period function (RPF) of weight 2k (k ≥ 0) for P SL(2, Z) is a rational function q(z) satisfying the two identities

First Page		Document Content
$Riemann surfaces / Continued fractions / Lie groups / Constructible universe / Mbius transformation / Bessel function / Differential forms on a Riemann surface$ Date: 2011-06-28 09:26:28 Riemann surfaces Continued fractions Lie groups Constructible universe Mbius transformation Bessel function Differential forms on a Riemann surface		RATIONAL PERIOD FUNCTIONS FOR P SL(2, Z) YJ. Choie and D. Zagier A rational period function (RPF) of weight 2k (k ≥ 0) for P SL(2, Z) is a rational function q(z) satisfying the two identities Add to Reading List Source URL: people.mpim-bonn.mpg.de Download Document from Source Website File Size: 222,83 KB Share Document on Facebook

	DENSITY AND LOCATION OF RESONANCES FOR CONVEX CO-COMPACT HYPERBOLIC SURFACES ´ ERIC ´ FRED NAUD DocID: 1pXiT - View Document
	496 CHAPTER 9 from w to the center of Ci and Q maps that to the segment from Qw to the center of Df . Thus, this segment is mapped into itself and so, as above, the attracting ﬁxed DocID: 1pAPg - View Document
	RATIONAL PERIOD FUNCTIONS FOR P SL(2, Z) YJ. Choie and D. Zagier A rational period function (RPF) of weight 2k (k ≥ 0) for P SL(2, Z) is a rational function q(z) satisfying the two identities DocID: 1nDjl - View Document
	Hyperbolic cone-manifold structures with prescribed holonomy I: punctured tori Daniel V. Mathews Abstract We consider the relationship between hyperbolic cone-manifold structures on surfaces, and algebraic representation DocID: 1my9x - View Document
	The hyperbolic meaning of the Milnor–Wood inequality Daniel V. Mathews Abstract We introduce a notion of the twist of an isometry of the hyperbolic plane. This twist function is defined on the universal covering group DocID: 1mpqc - View Document