Details
Arithmetic Geometry, Number Theory, and Computation
Simons Symposia
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234,33 € |
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| Verlag: | Springer |
| Format: | |
| Veröffentl.: | 15.03.2022 |
| ISBN/EAN: | 9783030809140 |
| Sprache: | englisch |
| Anzahl Seiten: | 587 |
Dieses eBook enthält ein Wasserzeichen.
Beschreibungen
<div>This volume contains articles related to the work of the Simons Collaboration “Arithmetic Geometry, Number Theory, and Computation.” The papers present mathematical results and algorithms necessary for the development of large-scale databases like the L-functions and Modular Forms Database (LMFDB). The authors aim to develop systematic tools for analyzing Diophantine properties of curves, surfaces, and abelian varieties over number fields and finite fields. The articles also explore examples important for future research.</div><div><br></div><div>Specific topics include</div><div>● algebraic varieties over finite fields</div><div>● the Chabauty-Coleman method</div><div>● modular forms</div><div>● rational points on curves of small genus</div><div>● S-unit equations and integral points.</div>
<p> A robust implementation for solving the S-unit equation and several application (C. Rasmussen).- Computing classical modular forms for arbitrary congruence subgroups (E. Assaf).- Square root time Coleman integration on superelliptic curves (A. Best).- Computing classical modular forms ( A. Sutherland).- Elliptic curves with good reduction outside of the first six primes (B. Matschke).- Efficient computation of BSD invariants in genus 2 (R. van Bommel).- Restrictions on Weil polynomials of Jacobians of hyperelliptic curves (E. Costa).- Zen and the art of database maintenance (D. Roe).- Effective obstructions to lifting Tate classes from positive characteristic (E. Costa).- Conjecture: 100% of elliptic surfaces over Q have rank zero (A. Cowan).- On rational Bianchi newforms and abelian surfaces with quaternionic multiplication (J. Voight).- A database of Hilbert modular forms (J. Voight).- Isogeny classes of Abelian Varieties over Finite Fields in the LMFDB (D. Roe).- Computing rational points on genus 3 hyperelliptic curves (S. Hashimoto).- Curves with sharp Chabauty-Coleman bound (S. Gajović).- Chabauty-Coleman computations on rank 1 Picard curves (S. Hashimoto).- Linear dependence among Hecke eigenvalues (D. Kim).- Congruent number triangles with the same hypotenuse (D. Lowry-Duda).- Visualizing modular forms (D. Lowry-Duda).- A Prym variety with everywhere good reduction over <b>Q</b>(√ 61) ( J. Voight).- The S-integral points on the projective line minus three points via étale covers and Skolem's method (B. Poonen).</p>
<div><div><b>Jennifer Balakrishnan</b> is Clare Boothe Luce Associate Professor of Mathematics and Statistics at Boston University. She holds a Ph.D. in Mathematics from the Massachusetts Institute of Technology.</div><div><br></div><div><b>Noam Elkies</b> is Professor of Mathematics at Harvard University. He holds a Ph.D. in Mathematics from Harvard University.</div><div><b><br></b></div><div><b>Brendan Hassett</b> is Professor of Mathematics at Brown University and Director of the Institute for Computational and Experimental Research in Mathematics. He holds a Ph.D. in Mathematics from Harvard University.</div><div><br></div><div><b>Bjorn Poonen </b>is Distinguished Professor in Science at the Massachusetts Institute of Technology. He holds a Ph.D. in Mathematics from the University of California at Berkeley.</div><div><b><br></b></div><div><b>Andrew Sutherland</b> is Principal Research Scientist at the Massachusetts Institute of Technology. He holds a Ph.D. in Mathematics from the Massachusetts Institute of Technology.</div><div><br></div><div><b>John Voight</b> is Professor of Mathematics at Dartmouth College. He holds a Ph.D. in Mathematics from the University of California at Berkeley.</div></div>
<div>This volume contains articles related to the work of the Simons Collaboration “Arithmetic Geometry, Number Theory, and Computation.” The papers present mathematical results and algorithms necessary for the development of large-scale databases like the L-functions and Modular Forms Database (LMFDB). The authors aim to develop systematic tools for analyzing Diophantine properties of curves, surfaces, and abelian varieties over number fields and finite fields. The articles also explore examples important for future research.</div><div><br></div><div>Specific topics include</div><div>● algebraic varieties over finite fields</div><div>● the Chabauty-Coleman method</div><div>● modular forms</div><div>● rational points on curves of small genus</div><div>● S-unit equations and integral points.</div>
Presents number theory as a computational discipline Focuses on key examples central to future research Supports foundational work at the intersection of arithmetic geometry and data science
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