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Fri, 9 May 2008
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Articles by M.Stoll

Articles 1 to 22 of 22

1. [abs] [pdf] arXiv:0803.3165 Documentation for the ratpoints program. Michael Stoll. math.NT.
2. [abs] [pdf] arXiv:0803.2836 Rational 6-cycles under iteration of quadratic polynomials. Michael Stoll. math.NT.
3. [abs] [pdf] [ps] arXiv:0803.2052 Two-cover descent on hyperelliptic curves. Nils Bruin, Michael Stoll. math.NT.
4. [abs] [pdf] [ps] arXiv:0801.4459 Integral Points on Hyperelliptic Curves. Y. Bugeaud, M. Mignotte, S. Siksek, M. Stoll, Sz. Tengely. math.NT.
5. [abs] [pdf] [ps] arXiv:0710.2079 The yoga of the Cassels-Tate pairing. Tom Fisher, Edward F. Schaefer, Michael Stoll. math.NT.
6. [abs] [pdf] [ps] math.NT/0611694 Descent on elliptic curves. Michael Stoll. math.NT.
7. [abs] [pdf] [ps] math.NT/0611606 Explicit n-descent on elliptic curves, II. Geometry. John Cremona, Tom Fisher, Cathy O'Neil, Denis Simon, Michael Stoll. math.NT.
8. [abs] [pdf] [ps] math.NT/0606580 Explicit n-descent on elliptic curves, I. Algebra. John Cremona, Tom Fisher, Cathy O'Neil, Denis Simon, Michael Stoll. math.NT.
9. [abs] [pdf] [ps] math/0606465 Finite descent obstructions and rational points on curves. Michael Stoll. math.NT.
10. [abs] [pdf] [ps] math.NT/0604524 Deciding existence of rational points on curves: an experiment. Nils Bruin, Michael Stoll. math.NT.
11. [abs] [pdf] [ps] math.NT/0604425 On the number of rational squares at fixed distance from a fifth power. Michael Stoll (International University Bremen). Acta Arith. 125, 79-88 (2006). math.NT.
12. [abs] [pdf] [ps] physics/0604079 Magnetic trapping of buffer-gas cooled chromium atoms and prospects for the extension to paramagnetic molecules. Joost M. Bakker, Michael Stoll, Dennis R. Weise, Oliver Vogelsang, Gerard Meijer, Achim Peters. J. Phys. B: At. Mol. Opt. Phys. 39, S1111-S1123, 2006. physics.atom-ph.
13. [abs] [pdf] [ps] math.NT/0603557 Independence of rational points on twists of a given curve. Michael Stoll. Compositio Math. 142, 1201-1214 (2006). math.NT.
14. [abs] [pdf] [ps] math.NT/0508174 Twists of X(7) and primitive solutions to x^2+y^3=z^7. Bjorn Poonen, Edward F. Schaefer, Michael Stoll. math.NT (math.AG).
15. [abs] [pdf] [ps] quant-ph/0412064 Matter Wave Diffraction from an Inclined Transmission Grating: Searching for the Elusive He-4 Trimer Efimov State. R. Bruehl, A. Kalinin, O. Kornilov, J. P. Toennies, (MPI fuer Stroemungsforschung, Goettingen), G. C. Hegerfeldt, M. Stoll (Institut fuer theoretische Physik, Universitaet Goettingen). physics.quant-ph.
16. [abs] [pdf] [ps] cond-mat/0410765 Production of three-body Efimov molecules in an optical lattice. Martin Stoll, Thorsten Koehler. Phys. Rev. A 72, 022714 (2005). physics.cond-mat.
17. [abs] [pdf] [ps] quant-ph/0410223 Matter diffraction at oblique incidence: Higher resolution and the Helium Trimer Efimov state. Gerhard C. Hegerfeldt, Martin Stoll (University of Goettingen). Phys. Rev. A 71, 033606 (2005). physics.quant-ph.
18. [abs] [pdf] [ps] math/0410026 An Introduction to Conway's Games and Numbers. Dierk Schleicher, Michael Stoll. Moscow Math Journal 6 2 (2006), 359-388. math.CO.
19. [abs] [pdf] [ps] quant-ph/0301069 Diffraction of Weakly Bound Clusters: Spectroscopy and Size Effects. Martin Stoll (1), Thorsten Koehler (2), Gerhard C. Hegerfeldt (1) ((1) Goettingen, Germany, (2) Oxford, UK). Proceedings of the International Congress on Theoretical Physics. Paris, July 2002. ISBN 3-7643-2433-3, Birkhäuser 2003. physics.quant-ph.
20. [abs] [pdf] [ps] quant-ph/0211076 Inelastic Diffraction and Spectroscopy of Very Weakly Bound Clusters. Martin Stoll (Goettingen, Germany), Thorsten Koehler (Oxford, UK). J. Phys. B 35, 4999-5011 (2002). physics.quant-ph.
21. [abs] [pdf] [ps] quant-ph/0112173 The van der Waals Potential between Metastable Atoms and Solid Surfaces: Novel Diffraction Experiments versus Theory. Ruediger Bruehl, Peter Fouquet, Robert E. Grisenti, J. Peter Toennies (Max-Planck-Institut fur Stroemungsforschung, Goettingen), ; Gerhard C. Hegerfeldt, Thorsten Koehler, Martin Stoll, Christian Walter (Institut fur theoretische Physik, Universitaet Goettingen). physics.quant-ph.
22. [abs] [pdf] [ps] math.NT/9911267 The Cassels-Tate pairing on polarized abelian varieties. Bjorn Poonen, Michael Stoll. Annals migration 4-2001. Ann. of Math. (2) 150 (1999), no. 3, 1109-1149. math.NT (math.AG).

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