GeometrySymposium/35
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GeometrySymposium :´ü´Ö:1988.07.25 -- 1988.07.30 :²ñ¾ì:¿®½£Âç³Ø * Einstein metrics ** ÀÕǤ¼Ô:Íî¹ç Âî»ÍϺ - ±Ý °ìϺ -- Einstein Kahler·×Î̤ˤĤ¤¤Æ¤Îsurvey¶,$c_1\leqq 0$¤Î¾ì¹ç - ËþÞ¼ ½Ó¼ù -- Survey on Einstein-Kahler metries,¶ - °ËÆ£ ¸÷¹°¡¢ÃæÅç ·¼ -- Yang-Mills connections and Einstein-Hermitian metrics (preliminary version) - ¾®ÎÓ Î¼°ì -- On Uniformizution of complex Surfaces A Survey -- K3¶ÊÌ̤ÎEinstein·×Î̤Υ⥸¥å¥é¥¤¤ÈÂಽ¤Ë¤Ä¤¤¤Æ - »Ö²ì ¹°Åµ -- K3 modular È¡¿ô¤Ë¤Ä¤¤¤Æ - ÈÄÅì ½ÅÌ¡¢²Ã¿Ü±É ÆÆ¡¢ÃæÅç ·¼ -- On a construction of coordinates at infinity on manifola with fast urvature decay and maximal volume growth - ¾®ÎÓ ¼£ -- »³ÊÕ¿ô¤Ë¤Ä¤¤¤Æ - Ãæ²°Éß ¸ü -- ¥¢¡¼¥Ù¥ë¿ÍÍÂξå¤Î line bundle ¤ÎÊÑ·Á¤È²ÄÀÑʬ·Ï *Yang-Mills connections **ÀÕǤ¼Ô:°ËÆ£ ¸÷¹° - Á°ÅÄ µÈ¾¼¡¢¾®±ò ±Ñͺ -- On Asympototic Stability for the Yang-Mills Gradient Fiow - ÅÚ°æ ±Ñͺ -- »Í¸µ¿ô¼Í±Æ¶õ´Ö¾å¤Î1-¥¤¥ó¥¹¥¿¥ó¥È¥ó¤Î´ö²¿ - ¿·ÅÄ µ®»Î -- Compactifications of moduli spaces of Einstein-hermitian connections for null-correlatio bundles - µÜÅè ¸øÉ× -- ¥·¥ó¥×¥ë¥Ù¥¯¥È¥ë«¤Î¥â¥¸¥å¥é¥¤¶õ´Ö¤Ë´Ø¤¹¤ë°ìÃí°Õ - Ĺ߷ ÁÔÇ· -- Asymptotical Stability of Yang-Mills' Gradient Flow - ¿À»³ Ì÷ɧ -- $S^4$¾å¤Îinstanton¤Îmoduli¶õ´Ö¤ÎÆ󼡸µBetti¿ô - ¾¾±Ê ¹°Æ» -- ƱÊÑYang-Mills connection¤Ë¤Ä¤¤¤Æ - ¶¶ËÜ µÁÉð -- Orbifold instantons ¤Îmoduli¶õ´Ö¤Î¥³¥ó¥Ñ¥¯¥ÈÀ *Finsler geometry **ÀÕǤ¼Ô:¼ÆÅÄ Ä¸¸÷ - ¶¶ËÜ À¿ -- ¥Õ¥¤¥ó¥¹¥é¡¼´ö²¿³Ø¤Î»°ÂçÌäÂê - °ì¾ò µÁÇî -- ³µFinsler¹½Â¤¤ÈFinsler¶õ´Ö - Ê¡°æ ¾»¼ù -- On the Kahler form in complex Finsler geometry *Dynamical systems and geometry **ÀÕǤ¼Ô:´ä°æ ÉÒÍÎ - »°¾å ·òÂÀϺ -- ¤¢¤ë¥Ý¥¢¥½¥ó¹½Â¤¤È¥·¥ó¥×¥ì¥Æ¥£¥Ã¥¯¡¦¥°¥ë¥Ý¥¤¥É - µÈ²¬ ϯ -- Bochner-Laplacian ¤Î¸ÇÍÃÍÌäÂê¤ËÂФ¹¤ëquasi-classical calculations¤Ë¤Ä¤¤¤Æ - ÌÀ»³ ¹À -- ¿ÍÍÂξå¤Î³ÎΨŪή¤ì¤Ë¤Ä¤¤¤Æ - ·¬¸¶ Îà»Ë -- ¥Ù¥¯¥È¥ë¥Ý¥Æ¥ó¥·¥ã¥ë¾ì¤Ë±÷¤±¤ë¸ÅŵÎϳؤÈÎÌ»ÒÎÏ³Ø - ÅÏÊÕ Ë§±Ñ -- ÈóÀþ·ÁȯŸÊýÄø¼°¤ÎLie-Bscklund symmetry¤ÈHamilton¹½Â¤ *Lie sphere geometry and twister geometry **ÀÕǤ¼Ô:º´Æ£ È¥¡¢»³¸ý ²Â»° - ¶â»Ò ¾ù°ì -- ÇÈÆ°ÊýÄø¼°¤ÈDupinĶ¶ÊÌÌ - µÜ²¬ Îé»Ò -- Dupin¤ÎĶ¶ÊÌ̤ˤĤ¤¤Æ - ¶â°æ ²íɧ -- Éé¶ÊΨ¿ÍÍÂΤάÃÏή¤Î´ö²¿ - º´Æ£ È¥ -- Lie Sphere Geometry ¤È Twinton Geometry - ¾®Âô ůÌé -- Taut embedding ¤Î¹½Â¤ - »³¸ý ²Â»° -- Lie geometry ¤Î symbol ¤Ë¤Ä¤¤¤Æ *Tensor geometry **ÀÕǤ¼Ô:°õÆî ¿®¹¨ - ÄÍÅÄ ÏÂÈþ -- Åù¼Á¶õ´Ö¤Î¶É½êÈùʬ´ö²¿ - ÇðÅÄ Ë»Ò -- curvature tensor ¤Îʬ²ò¤Ë¤Ä¤¤¤Æ - ¹âÌî ²Å¼÷ɧ -- The first proper space of for 2-forms in compact Kaehlrian manifolds of -positive curvature operator - ÌøËÜ ¹À -- ³ÈÄ¥¥¨¥Í¥ë¥®¡¼ËÞ´Ø¿ô¤È¤½¤Î±þÍÑ - ¸ÅÅÄ ¹â»Î -- On the Chern classes of some compact Riemannian 3-symmetric spaces - ¶âÊÁ ÕÜ -- Fibred Rimannian spaces with contact structure - ¿¹ Çî¡¢ÅÏÊÕ µÁÇ· -- Remarka on unitary-symmetris Kahler manifolds - º´Æ£ Âî¹À -- On some almost Hermitian manifolds with constant holomorphic sectional curvature *Geometry of Laplace operator **ÀÕǤ¼Ô:±ºÀî È¥ - ½ÅÀî °ìϺ -- Mallia vin calculus ¤È¥ê¡¼¥Þ¥ó¿ÍÍÂΤΥ¹¥Ú¥¯¥È¥ë - »³¸ý À¿°ì -- ¶¦·Á¥¥ê¥ó¥° p ·Á¼°¤È¼Í·Á¥¥ê¥ó¥° p ·Á¼°¤ÎÈùʬ´ö²¿³Ø - º½ÅÄ Íø°ì¡¢¾¡ÅÄ ÆÆ -- ÎϳطϤÎL-´Ø¿ô¤ÈÊĵ°Æ» - ÆâÆ£ µ×»ñ -- Harmonic map ¤Î°ÂÄêÀ¤È Eells-Sampson ÊýÄø¼°¤ÎÁ²¶áµóÆ° - ÃÓÅÄ ¾Ï -- O-isospectral ¤Ç p-isospectral ¤Ç¤Ê¤¤¥ê¡¼¥Þ¥ó¿ÍÍÂΤÎÎã - ÉðÆ£ ½¨É× -- µåÌÌÆâ¤Î¶Ë¾®Ä¶¶ÊÌ̤Î$¦Ë_1$¤Ë¤Ä¤¤¤Æ - ±×²¬ ε²ð -- Riemann¿ÍÍÂΤΰÂÄêÀ¤Ë¤Ä¤¤¤Æ(On the stability of Riemannian manifolds) - ²¬°Â δ -- ĴϼÌÁü¤È¶Ë¾®Éôʬ¿ÍÍÂΤÎÈó°ÂÄêÀ¤Ë¤Ä¤¤¤Æ *Geometry of submanifolds **ÀÕǤ¼Ô:²®¾å ¹É°ì - Ç߸¶ ²í¸²¡¢»³ÅÄ ¸÷ÂÀϺ -- E3¤ÎÃæ¤Î¥³¥ó¥Ñ¥¯¥ÈÊ¿¶Ñ¶ÊΨ°ìÄê¤Î¶ÊÌ̤ΠGauss map ¤Ë¤Ä¤¤¤Æ - ±§ÅÄÀî À¿°ì -- ¥±¡¼¥é¡¼Â¿ÍÍÂΤ«¤é¤Î¤¢¤ë¼ï¤ÎĴϼÌÁü¤ÎÄêÃÍÀ¡¢ÀµÂ§ÀµÚ¤Ó°ÂÄêÀ - ë¸ý µÁ¹À -- Ê£ÁǶõ´Ö·Á¤Î¥±¡¼¥é¡¼Éôʬ¿ÍÍÂΤιäÀ¤ÈÅù¼ÁÀ¤Ë¤Ä¤¤¤Æ - ĹÌî Àµ¡¢Ïɸ« ¿¿µª»Ò -- ÂоδÖÍýÏÀ¤Î´ðÁà - ºç ¿¿ -- Estimates on stability of minimal surfaces and hormonic maps - ËÌÀî µÁµ× -- Rigidity of the Clifford tori in $S_3$ - Í·º´ µ£ -- (Co-)Normal Bundle ¤Î´ÑÅÀ¤«¤é¸«¤¿¼Í±Æ¶õ´Ö¤Ø¤ÎËä¤á¹þ¤ß - ³©Àî ÏÂͺ -- The Dirichlet problem at infinity harmonic mappings between negatively curved manifolds - ¶¶ËÜ ±ÑºÈ -- 4,8¼¡¸µ¥æ¡¼¥¯¥ê¥Ã¥É¶õ´ÖÆâ¤Î¤¢¤ë¿ÍÍÂΤˤĤ¤¤Æ - ½ù ±ËÄá¢Á껳 Îè»Ò -- Semi-Kaehlerian Submanifolds of an Indefinite Complex Space Form - ¾®ÃÓ Ä¾Ç· -- Semi-Riemannian space form ¤Ë¤ª¤±¤ë¤¢¤ë semi-Riemann Éôʬ¿ÍÍÂÎ *Riemannian geometry **ÀÕǤ¼Ô:¼ò°æ δ - ¿¼Ã« ¸¼£ -- Almost nonpositively curved manifolds - ±öë δ -- The ideal boundaries of complete open surfaces - Á°ÅÄ ÀµÃË -- pole¤Î½¸¹ç¤Ë¤Ä¤¤¤Æ - ÅÄÃæ ¼Â -- ¶ÊÌ̾å¤ÎÅù¼þÉÔÅù¼°¤ÈÁ´¶ÊΨ - ¾®Ã« ÈË -- ¶³¦¤ò»ý¤Ä¥ê¡¼¥Þ¥ó¿ÍÍÂΤμý«ÄêÍý - ÂçÄÅ ¹¬ÃË -- Â礤ÊÂÎÀѤò»ý¤ÄÀµ¶ÊΨ¿ÍÍÂΤÎÈùʬ¹½Â¤¤Ë¤Ä¤¤¤Æ - »ÔÅÄ ÎÉÊå -- ¥ê¡¼¥Þ¥ó¿ÍÍÂΤΤ¢¤ëʬ²ò - °ËÆ£ ¿Î°ì -- Â礤Êľ·Â¤ÎÀµ¶ÊΨ¿ÍÍÂÎ - ²Ï¾å È¥ -- On Manifolds with Negative Ricci or Scalar Curvature and with Compact Boundaries - ¸Þ½½Íò ²íÇ· -- On the bisectable metrics on $S_2$ - ¼ò°æ δ -- ¶ÊÌ̤ËÂФ¹¤ë isosystolic ÉÔÅù¼° - °ËÆ£ À¶ -- (»°¼¡¸µ)compact almost flat manifold ¤ÎʬÎà
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GeometrySymposium :´ü´Ö:1988.07.25 -- 1988.07.30 :²ñ¾ì:¿®½£Âç³Ø * Einstein metrics ** ÀÕǤ¼Ô:Íî¹ç Âî»ÍϺ - ±Ý °ìϺ -- Einstein Kahler·×Î̤ˤĤ¤¤Æ¤Îsurvey¶,$c_1\leqq 0$¤Î¾ì¹ç - ËþÞ¼ ½Ó¼ù -- Survey on Einstein-Kahler metries,¶ - °ËÆ£ ¸÷¹°¡¢ÃæÅç ·¼ -- Yang-Mills connections and Einstein-Hermitian metrics (preliminary version) - ¾®ÎÓ Î¼°ì -- On Uniformizution of complex Surfaces A Survey -- K3¶ÊÌ̤ÎEinstein·×Î̤Υ⥸¥å¥é¥¤¤ÈÂಽ¤Ë¤Ä¤¤¤Æ - »Ö²ì ¹°Åµ -- K3 modular È¡¿ô¤Ë¤Ä¤¤¤Æ - ÈÄÅì ½ÅÌ¡¢²Ã¿Ü±É ÆÆ¡¢ÃæÅç ·¼ -- On a construction of coordinates at infinity on manifola with fast urvature decay and maximal volume growth - ¾®ÎÓ ¼£ -- »³ÊÕ¿ô¤Ë¤Ä¤¤¤Æ - Ãæ²°Éß ¸ü -- ¥¢¡¼¥Ù¥ë¿ÍÍÂξå¤Î line bundle ¤ÎÊÑ·Á¤È²ÄÀÑʬ·Ï *Yang-Mills connections **ÀÕǤ¼Ô:°ËÆ£ ¸÷¹° - Á°ÅÄ µÈ¾¼¡¢¾®±ò ±Ñͺ -- On Asympototic Stability for the Yang-Mills Gradient Fiow - ÅÚ°æ ±Ñͺ -- »Í¸µ¿ô¼Í±Æ¶õ´Ö¾å¤Î1-¥¤¥ó¥¹¥¿¥ó¥È¥ó¤Î´ö²¿ - ¿·ÅÄ µ®»Î -- Compactifications of moduli spaces of Einstein-hermitian connections for null-correlatio bundles - µÜÅè ¸øÉ× -- ¥·¥ó¥×¥ë¥Ù¥¯¥È¥ë«¤Î¥â¥¸¥å¥é¥¤¶õ´Ö¤Ë´Ø¤¹¤ë°ìÃí°Õ - Ĺ߷ ÁÔÇ· -- Asymptotical Stability of Yang-Mills' Gradient Flow - ¿À»³ Ì÷ɧ -- $S^4$¾å¤Îinstanton¤Îmoduli¶õ´Ö¤ÎÆ󼡸µBetti¿ô - ¾¾±Ê ¹°Æ» -- ƱÊÑYang-Mills connection¤Ë¤Ä¤¤¤Æ - ¶¶ËÜ µÁÉð -- Orbifold instantons ¤Îmoduli¶õ´Ö¤Î¥³¥ó¥Ñ¥¯¥ÈÀ *Finsler geometry **ÀÕǤ¼Ô:¼ÆÅÄ Ä¸¸÷ - ¶¶ËÜ À¿ -- ¥Õ¥¤¥ó¥¹¥é¡¼´ö²¿³Ø¤Î»°ÂçÌäÂê - °ì¾ò µÁÇî -- ³µFinsler¹½Â¤¤ÈFinsler¶õ´Ö - Ê¡°æ ¾»¼ù -- On the Kahler form in complex Finsler geometry *Dynamical systems and geometry **ÀÕǤ¼Ô:´ä°æ ÉÒÍÎ - »°¾å ·òÂÀϺ -- ¤¢¤ë¥Ý¥¢¥½¥ó¹½Â¤¤È¥·¥ó¥×¥ì¥Æ¥£¥Ã¥¯¡¦¥°¥ë¥Ý¥¤¥É - µÈ²¬ ϯ -- Bochner-Laplacian ¤Î¸ÇÍÃÍÌäÂê¤ËÂФ¹¤ëquasi-classical calculations¤Ë¤Ä¤¤¤Æ - ÌÀ»³ ¹À -- ¿ÍÍÂξå¤Î³ÎΨŪή¤ì¤Ë¤Ä¤¤¤Æ - ·¬¸¶ Îà»Ë -- ¥Ù¥¯¥È¥ë¥Ý¥Æ¥ó¥·¥ã¥ë¾ì¤Ë±÷¤±¤ë¸ÅŵÎϳؤÈÎÌ»ÒÎÏ³Ø - ÅÏÊÕ Ë§±Ñ -- ÈóÀþ·ÁȯŸÊýÄø¼°¤ÎLie-Bscklund symmetry¤ÈHamilton¹½Â¤ *Lie sphere geometry and twister geometry **ÀÕǤ¼Ô:º´Æ£ È¥¡¢»³¸ý ²Â»° - ¶â»Ò ¾ù°ì -- ÇÈÆ°ÊýÄø¼°¤ÈDupinĶ¶ÊÌÌ - µÜ²¬ Îé»Ò -- Dupin¤ÎĶ¶ÊÌ̤ˤĤ¤¤Æ - ¶â°æ ²íɧ -- Éé¶ÊΨ¿ÍÍÂΤάÃÏή¤Î´ö²¿ - º´Æ£ È¥ -- Lie Sphere Geometry ¤È Twinton Geometry - ¾®Âô ůÌé -- Taut embedding ¤Î¹½Â¤ - »³¸ý ²Â»° -- Lie geometry ¤Î symbol ¤Ë¤Ä¤¤¤Æ *Tensor geometry **ÀÕǤ¼Ô:°õÆî ¿®¹¨ - ÄÍÅÄ ÏÂÈþ -- Åù¼Á¶õ´Ö¤Î¶É½êÈùʬ´ö²¿ - ÇðÅÄ Ë»Ò -- curvature tensor ¤Îʬ²ò¤Ë¤Ä¤¤¤Æ - ¹âÌî ²Å¼÷ɧ -- The first proper space of for 2-forms in compact Kaehlrian manifolds of -positive curvature operator - ÌøËÜ ¹À -- ³ÈÄ¥¥¨¥Í¥ë¥®¡¼ËÞ´Ø¿ô¤È¤½¤Î±þÍÑ - ¸ÅÅÄ ¹â»Î -- On the Chern classes of some compact Riemannian 3-symmetric spaces - ¶âÊÁ ÕÜ -- Fibred Rimannian spaces with contact structure - ¿¹ Çî¡¢ÅÏÊÕ µÁÇ· -- Remarka on unitary-symmetris Kahler manifolds - º´Æ£ Âî¹À -- On some almost Hermitian manifolds with constant holomorphic sectional curvature *Geometry of Laplace operator **ÀÕǤ¼Ô:±ºÀî È¥ - ½ÅÀî °ìϺ -- Mallia vin calculus ¤È¥ê¡¼¥Þ¥ó¿ÍÍÂΤΥ¹¥Ú¥¯¥È¥ë - »³¸ý À¿°ì -- ¶¦·Á¥¥ê¥ó¥° p ·Á¼°¤È¼Í·Á¥¥ê¥ó¥° p ·Á¼°¤ÎÈùʬ´ö²¿³Ø - º½ÅÄ Íø°ì¡¢¾¡ÅÄ ÆÆ -- ÎϳطϤÎL-´Ø¿ô¤ÈÊĵ°Æ» - ÆâÆ£ µ×»ñ -- Harmonic map ¤Î°ÂÄêÀ¤È Eells-Sampson ÊýÄø¼°¤ÎÁ²¶áµóÆ° - ÃÓÅÄ ¾Ï -- O-isospectral ¤Ç p-isospectral ¤Ç¤Ê¤¤¥ê¡¼¥Þ¥ó¿ÍÍÂΤÎÎã - ÉðÆ£ ½¨É× -- µåÌÌÆâ¤Î¶Ë¾®Ä¶¶ÊÌ̤Î$¦Ë_1$¤Ë¤Ä¤¤¤Æ - ±×²¬ ε²ð -- Riemann¿ÍÍÂΤΰÂÄêÀ¤Ë¤Ä¤¤¤Æ(On the stability of Riemannian manifolds) - ²¬°Â δ -- ĴϼÌÁü¤È¶Ë¾®Éôʬ¿ÍÍÂΤÎÈó°ÂÄêÀ¤Ë¤Ä¤¤¤Æ *Geometry of submanifolds **ÀÕǤ¼Ô:²®¾å ¹É°ì - Ç߸¶ ²í¸²¡¢»³ÅÄ ¸÷ÂÀϺ -- E3¤ÎÃæ¤Î¥³¥ó¥Ñ¥¯¥ÈÊ¿¶Ñ¶ÊΨ°ìÄê¤Î¶ÊÌ̤ΠGauss map ¤Ë¤Ä¤¤¤Æ - ±§ÅÄÀî À¿°ì -- ¥±¡¼¥é¡¼Â¿ÍÍÂΤ«¤é¤Î¤¢¤ë¼ï¤ÎĴϼÌÁü¤ÎÄêÃÍÀ¡¢ÀµÂ§ÀµÚ¤Ó°ÂÄêÀ - ë¸ý µÁ¹À -- Ê£ÁǶõ´Ö·Á¤Î¥±¡¼¥é¡¼Éôʬ¿ÍÍÂΤιäÀ¤ÈÅù¼ÁÀ¤Ë¤Ä¤¤¤Æ - ĹÌî Àµ¡¢Ïɸ« ¿¿µª»Ò -- ÂоδÖÍýÏÀ¤Î´ðÁà - ºç ¿¿ -- Estimates on stability of minimal surfaces and hormonic maps - ËÌÀî µÁµ× -- Rigidity of the Clifford tori in $S_3$ - Í·º´ µ£ -- (Co-)Normal Bundle ¤Î´ÑÅÀ¤«¤é¸«¤¿¼Í±Æ¶õ´Ö¤Ø¤ÎËä¤á¹þ¤ß - ³©Àî ÏÂͺ -- The Dirichlet problem at infinity harmonic mappings between negatively curved manifolds - ¶¶ËÜ ±ÑºÈ -- 4,8¼¡¸µ¥æ¡¼¥¯¥ê¥Ã¥É¶õ´ÖÆâ¤Î¤¢¤ë¿ÍÍÂΤˤĤ¤¤Æ - ½ù ±ËÄá¢Á껳 Îè»Ò -- Semi-Kaehlerian Submanifolds of an Indefinite Complex Space Form - ¾®ÃÓ Ä¾Ç· -- Semi-Riemannian space form ¤Ë¤ª¤±¤ë¤¢¤ë semi-Riemann Éôʬ¿ÍÍÂÎ *Riemannian geometry **ÀÕǤ¼Ô:¼ò°æ δ - ¿¼Ã« ¸¼£ -- Almost nonpositively curved manifolds - ±öë δ -- The ideal boundaries of complete open surfaces - Á°ÅÄ ÀµÃË -- pole¤Î½¸¹ç¤Ë¤Ä¤¤¤Æ - ÅÄÃæ ¼Â -- ¶ÊÌ̾å¤ÎÅù¼þÉÔÅù¼°¤ÈÁ´¶ÊΨ - ¾®Ã« ÈË -- ¶³¦¤ò»ý¤Ä¥ê¡¼¥Þ¥ó¿ÍÍÂΤμý«ÄêÍý - ÂçÄÅ ¹¬ÃË -- Â礤ÊÂÎÀѤò»ý¤ÄÀµ¶ÊΨ¿ÍÍÂΤÎÈùʬ¹½Â¤¤Ë¤Ä¤¤¤Æ - »ÔÅÄ ÎÉÊå -- ¥ê¡¼¥Þ¥ó¿ÍÍÂΤΤ¢¤ëʬ²ò - °ËÆ£ ¿Î°ì -- Â礤Êľ·Â¤ÎÀµ¶ÊΨ¿ÍÍÂÎ - ²Ï¾å È¥ -- On Manifolds with Negative Ricci or Scalar Curvature and with Compact Boundaries - ¸Þ½½Íò ²íÇ· -- On the bisectable metrics on $S_2$ - ¼ò°æ δ -- ¶ÊÌ̤ËÂФ¹¤ë isosystolic ÉÔÅù¼° - °ËÆ£ À¶ -- (»°¼¡¸µ)compact almost flat manifold ¤ÎʬÎà
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