Andrew Wiles Building
Radcliffe Observatory Quarter
Oxford OX2 6GG, UK
Organisers: Jonathan Pila (Oxford) and Alex Wilkie (Manchester)
Schanuel's conjecture governs the transcendence properties of the exponential function. In a differential field it is a theorem of Ax (1971). Natural analogues for the uniformising maps of Shimura varieties, and related formulations, are of interest in Diophantine geometry, differential Galois theory, model theory, and complex geometry. This workshop will gather participants from all these disciplines to share methods, results, and conjectures around this topic.
Speakers: Daniel Bertrand (Jussieu), Alexandru Buium (New Mexico), Philipp Habegger (Darmstadt), Jonathan Kirby (East Anglia), Bruno Klingler (Jussieu), Piotr Kowalski (Wroclaw), Angus Macintyre (Queen Mary London), David Masser (Basel), Ngaiming Mok (Hong Kong), Anand Pillay (Notre Dame), Thomas Scanlon (Berkeley), Michael Singer (North Carolina State), Jacob Tsimerman (Harvard), Emmanuel Ullmo (Paris Sud), Andrei Yafaev (UCL), Sai Kee Yeung (Purdue), Umberto Zannier (Pisa), Boris Zilber (Oxford)
Partially supported by EPSRC grant EP/J019232/1.
Registration is free but required. To register, please email Naomi Kraker, providing the name of your institution and stating which workshop you wish to attend. Students please also provide a letter of reference from your supervisor.