<html><head><meta http-equiv="content-type" content="text/html; charset=utf-8"></head><body dir="auto"><div><span></span></div><div><div dir="ltr">Dear All,<div><br></div><div>IMBM (Bogazici University, Istanbul) will host our workshop on "Iwasawa theory and (p-adic) Beilinson conjectures" to take place on September 15th (Tuesday) and September 17th (Thursday). Please find the program of the talks and the abstracts at the bottom of this e-mail message.</div><div><br></div><div>We express our deep gratitude to IMBM for generously hosting the two speakers (Masataka Chida visiting from Tohoku and Fabien Trihan from Tokyo). The talks will take place in the IMBM building (located in the Bogazici University South Campus). We welcome all interested audience!</div><div><br></div><div>Kazim Buyukboduk</div><div><br></div><div><br></div><div>WORKSHOP ON IWASAWA THEORY AND (P-ADIC) BEILINSON CONJECTURES</div><div><br></div><div><div style="font-size:13px">PROGRAM:</div><div style="font-size:13px"><br></div><div style="font-size:13px">September 15th, Tuesday:<br></div><div style="font-size:13px"><br></div><div style="font-size:13px">10:30-12:00: Fabien Trihan (Tokyo)</div><div style="font-size:13px">Geometric Iwasawa Main and Equivariant Tamagawa Number Conjectures - I<br></div><div style="font-size:13px"><br></div><div style="font-size:13px">13:30-14:30: Kazim Buyukboduk</div><div style="font-size:13px">Exceptional zeros of p-non-ordinary forms and Perrin-Riou's conjecture - I<br></div><div style="font-size:13px"><br></div><div style="font-size:13px">15:00-16:30: Masataka Chida (Tohoku)</div><div style="font-size:13px">Selmer groups and the central values of L-functions for modular forms.<br></div><div style="font-size:13px"><br></div><div style="font-size:13px"><br></div><div style="font-size:13px"><div>September 17th, Thursday:<br></div><div><br></div><div>10:30-12:00: Masataka Chida (Tohoku)</div><div>Beilinson-Flach elements for higher weight modular forms.<br></div><div><br></div><div>13:30-14:30: Kazim Buyukboduk</div><div>Exceptional zeros of p-non-ordinary forms and Perrin-Riou's conjecture - II<br></div><div><br></div><div>15:00-16:30: Fabien Trihan (Tokyo)</div><div>Geometric Iwasawa Main and Equivariant Tamagawa Number Conjectures - II<br></div><div><br></div></div><div style="font-size:13px"><br></div><div style="font-size:13px">ABSTRACTS</div><div style="font-size:13px"><br></div><div style="font-size:13px">Exceptional zeros of p-non-ordinary forms and Perrin-Riou's conjecture (Buyukboduk):<br></div><div style="font-size:13px"><br></div><div style="font-size:13px">I will report on a joint work with Denis Benois where we prove a p-adic Beilinson formula for the second derivative of the p-adic L-function associated to a newform f which is non-crystalline semistable at p, at its central critical point, by expressing this quantity in terms of a p-adic (cyclotomic) regulator defined on an extended trianguline Selmer group. We also prove a two-variable version of this result for height pairings we construct by considering infinitesimal deformations afforded by a Coleman family passing through f. This, among other things, leads us to a proof of a version of Perrin-Riou's conjecture in this set up, allowing us to relate Heegner cycles on appropriately chosen Shimura curves to Beilinson-Kato elements.<br></div><div style="font-size:13px"><br></div><div style="font-size:13px"><br></div><div style="font-size:13px">Selmer groups and the central values of L-functions for modular forms (Chida):<br></div><div style="font-size:13px"><br></div><div style="font-size:13px">In this talk, we will discuss on a relation between the order of Selmer groups and the central values of Rankin-Selberg L-functions associated to modular forms and finite order Hecke characters. In particular, we will show that the non-vanishing of the central L-value implies the finiteness of Selmer groups under mild assumptions, which is expected by Bloch-Kato's Tamagawa number conjecture. This is a generalization of results by Bertolini-Darmon and Longo-Vigni to higher weight modular forms. The proof uses a Kolyvagin system constructed from CM cycles on Kuga-Sato varieties over Shimura curves.<br></div><div style="font-size:13px"><br></div><div style="font-size:13px"><br></div><div style="font-size:13px">Beilinson-Flach elements for higher weight modular forms (Chida):<br></div><div style="font-size:13px"><br></div><div style="font-size:13px">This is a joint work with François Brunault. In this talk, we will construct an element in higher K-groups of the product of two Kuga-Sato varieties. This gives a generalization of Beilinson-Flach elements to higher weight modular forms. Also we will introduce an explicit formula for the image of the element under the regulator map. This result is related to Beilinson's conjecture on non-critical values of Rankin-Selberg L-functions for modular forms.<br></div><div style="font-size:13px"><br></div><div style="font-size:13px"><br></div><div style="font-size:13px">Geometric Iwasawa Main and Equivariant Tamagawa Number Conjectures (Trihan):</div><div style="font-size:13px"><br></div><div style="font-size:13px">Let A/K be an abelian variety over a function field of characteristic p>0. We will give a survey on recent results concerning the Iwasawa Main and ETN conjectures in this context.</div></div><div><br></div></div>
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