<--- Back to Details
First PageDocument Content
Motivic integration / Zeta function / Motivic zeta function / Mathematical analysis / Algebraic geometry / Mathematics
Date: 2012-05-17 10:08:27
Motivic integration
Zeta function
Motivic zeta function
Mathematical analysis
Algebraic geometry
Mathematics

Zeta Functions in Algebra and Geometry

Add to Reading List

Source URL: www.ams.org

Download Document from Source Website

File Size: 2,19 MB

Share Document on Facebook

Similar Documents

Mathematical analysis / Probability theory / Statistical theory / Asymptotic theory / Graph theory / Markov chain / Random variable / Conditional probability distribution / Stochastic processes / Harris chain / Law of large numbers

3 May 1998 ITERATED RANDOM FUNCTIONS Persi Diaconis Department of Mathematics & ORIE Cornell University

DocID: 1xVWv - View Document

Mathematics / Computer arithmetic / Numerical analysis / Applied mathematics / Arithmetic / Interval arithmetic / Computer-assisted proof / Computational science / Scan

SCAN 2018 Post-conference Proceedings Special Issue of Journal of Computational and Applied Mathematics Call for Papers Special Issue on the 18th International Symposium on Scientific Computing, Computer Arithmetic,

DocID: 1xVSx - View Document

Algebra / Mathematics / Polynomials / Computer algebra / Polynomial / General number field sieve / Resultant / Irreducible polynomial / Factorization / Polynomial greatest common divisor / Degree of a polynomial

MATHEMATICS OF COMPUTATION Volume 00, Number 0, Pages 000–000 SXXBETTER POLYNOMIALS FOR GNFS SHI BAI, CYRIL BOUVIER, ALEXANDER KRUPPA, AND PAUL ZIMMERMANN

DocID: 1xVRE - View Document

A characterization of Riemann integrability Cosmin Burtea Faculty of Mathematics, "Al. I. Cuza" University of Ia³i, Romania Abstract We prove a characterization of Riemann integrability by using some Darboux-like sums w

DocID: 1xVOd - View Document

Mathematics 7-12, BS "DBEFNJD.BQ  5IF"DBEFNJD.BQTFSWFTBTBTVHHFTUFEDPVSTFTFRVFODFPOMZ4UVEFOUTBSFOPUMJNJUFEUPUIJTQMBOJUJTNFBOUUPCFVTFEBT

DocID: 1xVH0 - View Document