<div dir="ltr"><span style="font-size:14px">縲縲縲縲縲縲縲</span><span class="m_-5480093848939463635m_-5950955769855886775gmail-m_4834250219696774986gmail-il" style="font-size:14px">繝溘ル</span><span class="m_-5480093848939463635m_-5950955769855886775gmail-m_4834250219696774986gmail-il" style="font-size:14px">繝ッ繝シ繧ッ</span><span class="m_-5480093848939463635m_-5950955769855886775gmail-m_4834250219696774986gmail-il" style="font-size:14px">繧キ繝ァ繝��</span><span style="font-size:14px">�亥キ昜コ輔�繝シ繝ォ�峨�縺顔衍繧峨○�郁ソス蜉�縺ィ螟画峩��</span><br><div class="gmail_quote"><div dir="ltr"><div><div class="gmail_quote"><div dir="ltr"><div><br>蜈医↓縺顔衍繧峨○縺励∪縺励◆<span style="font-size:14px">2譛�7譌・�育↓譖懶シ峨�繝溘ル繝ッ繝シ繧ッ繧キ繝ァ繝��縺ォ��<wbr>繝輔Φ繝懊Ν繝亥、ァ蟄ヲ縺ョBrueing豌上�</span></div><div><span style="font-size:14px">隰帶シ斐r霑ス蜉�縺輔○縺ヲ</span>縺�◆縺�縺阪∪縺呻シ弱◎縺ョ縺溘a�碁幕蟋区凾髢薙r10譎ゅ↓螟�<wbr>譖エ縺励◆縺�→諤昴>縺セ縺呻シ�</div><div>縺セ縺滂シ梧オキ螟悶°繧峨�縺贋コ御ココ縺ョ豁楢ソ惹シ壹r18譎ゅh繧翫>縺溘@縺セ縺吶�縺ァ�後#<wbr>蜿ょ刈縺�◆縺�縺代k譁ケ縺ッ5譌・縺セ縺ァ縺ォ</div><div>螳ョ蟯。縺セ縺ァ縺秘」邨。縺上□縺輔>��</div><div><br></div><div>繝励Ο繧ー繝ゥ繝���</div><div><br><span style="font-size:14px">2017蟷エ2譛�7譌・�育↓譖懶シ�</span><br style="font-size:14px"><span style="font-size:14px">10:00-11:00縲 譴カ繝カ隹キ蠕ケ�育肇邱冗�斐�</span><span style="font-size:14px">譚ア蛹怜、ァ謨ー逅��遶ッ譚先侭繝「繝�Μ繝ウ繧ー繧ェ繝シ繝励Φ繧、繝弱�<wbr>繝シ繧キ繝ァ繝ウ繝ゥ繝懊Λ繝医Μ</span><span style="font-size:14px">(MathAM-OIL)PD��</span></div><div><span><br style="font-size:14px"><span style="font-size:14px">Title: Reductions of minimal Lagrangian submanifolds with symmetries</span><br style="font-size:14px"><br style="font-size:14px"><span style="font-size:14px">Abstract: We give a Hsiang-Lawson type theorem for minimal Lagrangian submanifolds in a Kahler manifold. More precisely, we show the minimality of a K-invariant Lagrangian submanifold L in a Fano manifold M w.r.t. a globally conformal Kahler metric is equivalent to the minimality of the reduced Lagrangian submanifold L_0=L/K in a Kahler quotient w.r.t. the Hsiang-Lawson metric. Furthermore, we give some examples of Kahler reductions by using a circle action obtained from a chomogenenity one action on a Kahler-Einstein manifold of positive Ricci curvature. Applying these results, we give many examples of minimal Lagrangian submanifolds via reductions.</span><br style="font-size:14px"><br></span>11:15-12:15ツ�<span style="font-size:10pt;font-family:cmr10">JOCHEN BRUE</span><span style="font-size:10pt;font-family:cmr10">NING 縲(繝輔Φ繝懊Ν繝亥、ァ蟄ヲ�沓erlin)</span></div>
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<p><span style="font-size:10pt;font-family:cmr10">ツ�</span><span style="font-size:14px">Title: Global analysis onツ�Them-Mather spaces</span></p><p><span style="font-size:14px">Abstract: 豺サ莉倥ヵ繧。繧、繝ォ繧偵#繧峨s縺上□縺輔>��</span></p></div>
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</div><div><span><br><span style="font-size:14px">13:30-14:30縲螟ァ莉∫伐鄒ゥ陬包シ亥、ァ髦ェ蟶ょ、ァ�薫CAMI��</span><br style="font-size:14px"><br style="font-size:14px"><span style="font-size:14px">Title: On Floer homology of the Gauss images of isoparametric hyper surfaces</span><br style="font-size:14px"><br style="font-size:14px"><span style="font-size:14px">Abstract: Recently we used the Floer homology and the lifted Floer homology for</span><br style="font-size:14px"><span style="font-size:14px">monotone Lagrangian submanifoldsツ� in order to study their Hamiltonian non-displaceability</span><br style="font-size:14px"><span style="font-size:14px">(H. Iriyeh, H. Ma, R. Miyaoka and Y. Ohnita,</span><br style="font-size:14px"><span style="font-size:14px">Hamiltonian non-displaceability of Gauss images of isoparametric hyper surfaces,</span><br style="font-size:14px"><span style="font-size:14px">Bull. London Math. Soc. (2016) 48 (5): 802-812).</span><br style="font-size:14px"><span style="font-size:14px">In this talk, I would like to explain the spectral sequences for the Floer homology and the lifted Floer homology of monotone Lagrangian submanifolds and their applications to the Gauss images of isoparametric hypersurfaces, which are the main technical part in our joint work.</span><br style="font-size:14px"><span style="font-size:14px">Moreover I will suggest some related open problems for the further research.</span><br style="font-size:14px"><br style="font-size:14px"></span><span style="font-size:14px">15:00-16:00ツ� (蟷セ菴輔そ繝溘リ繝シ�壹%縺。繧峨b蟾昜コ輔�繝シ繝ォ縺ァ陦後>縺セ縺呻シ�</span><span><br style="font-size:14px"><br style="font-size:14px"><span style="font-size:14px">Z.Z.Tang (Chern Institute of Mathematics�悟圏莠ャ蟶ォ遽�、ァ蟄ヲ��</span><br style="font-size:14px"><span style="font-size:14px">Title: Recent progress in isoparametric foliation</span><br style="font-size:14px"><br style="font-size:14px"><span style="font-size:14px">Abstract: The talk will give a survey on our recent works on isoparametric foliation and its several applications(e.g. eigenvalue estimate of laplacian), based on the joint work with <a href="http://J.Q.Ge">J.Q.Ge</a>,ツ�</span><span style="font-size:14px">C.Qian and W.J. Yan.</span><br style="font-size:14px"><br style="font-size:14px"><span style="font-size:14px">18:00- 豁楢ソ惹シ�</span><br style="font-size:14px"><br style="font-size:14px"></span></div><div><span>縲縲縲縲縲縲縲縲縲縲縲縲縲縲縲縲縲縲螳ョ蟯。遉シ蟄�</span></div></div></div></div></div></div>
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