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ÔØÖºÊ×ÙÐØ×ÓØÌ×× ÑØÖ× ÌÐÖ×¸ÒÓØG N¸ÚØÖÖÐ×ÑÔÐÖÓÓØ×ÚÒÝØÓÐÐÓÛÒPGL(2, ´º¾µ Z) Ö×ÔØØÓØØÖÖÐ×ÑÔÐÖÓÓØ×ºÁØ×ÚÒÝ℄´×Ð×Ó½¼¸½℄µ )¸ÛØ δ . ÌÏÝÐÖÓÙÔ×ÒÖØÝØØÖÐÑÒØÖÝÖØÓÒ×¸(w 1 , w 2 , w 3 ´º¿µ ÐØØÏÝÐÚØÓÖØØ×Ø×× NÐ×ÓÚ ÛÖS ÛØÐÐØÖÐ×ÑÔÐÖÓÓØ×º 3×ØÖÓÙÔÓÔÖÑÙØØÓÒ×ÓØØÖÖÐ×ÑÔÐÖÓÓØ×ºÌG ´ºµ (ρ, δ i ) = − (δ i, δ i )¸ ) = −1 2 ´ÖÒØµÙØÓÑÓÖÔÓÖÖØÓÒ×ØÓØÄÐÖ××ÓØÛØØÖÒØÖ ØÙÒÑÒØÐÏÝÐÑÖ×ÒØÐØØÏÝÐÚØÓÖρÓØÃÅÄ×ÙÔÖ¹ NºÐÐØÐÖ×Ö×× ÌÖØÒÑØÖÜA 1,II¸Ø×ØÓÖÐ×ÑÔÐÖÓÓØ×¸δ 1 , δ 2 , δ 3¸ØÏÝÐÖÓÙÔW(A ÐÖ×G NÐ×ÓÚÑÒÖÝÖÓÓØ×ÛÓ×ÒÓÖÑ¸ÛØÖ×ÔØØÓÚÒÒÒÖÔÖÓÙØÒØ 1,IIÛØÖÐ×ÑÔÐÖÓÓØ×ÚÒÒ´º¾µºÌÃÅÄ×ÙÔÖÐÖ× NÓÒÓØÒÛØØÓÖÓÐÒÖÓÙÔZ 0ºÌ×ØÓÑÒÖÝÖÓÓØ× ÖØÒÑØÖÜA •ÁØÛ××ÓÛÒÒ℄ØØØÑÙÐØÔÐØ×ÓØÑÒÖÝ×ÑÔÐÖÓÓØ×ÓÖ ÓÛÚÖ¸ÒÛØNºÏ×Ù××Ø×ÔÓÒØÒÜØº NÐ×ÓÓÒÓØÒÛØNºÌÖÑÙÐØÔÐØ×¸ G ÖÓÓØ×Ô¸×ÒÓØÔÓ×ØÚÒØ¸ººØÒÓÖÑ(η, η) ≤ ÓØÃÅÄ×ÙÔÖÐÖ×G NÖÖÒØÓÖÖÒØNºÌÔÖÑØÚ )ÚÒÝØÓÖÑÙÐ ØÃÅÄ×ÙÔÖÐÖ×G ÐØ¹Ð×ÑÔÐÖÓÓØ×tη ÐÒØÓØ×ÐÖ×¸ÒÒØÒÓÑÒØÓÖÒØØ×ÓØÐÖ×¸ÓÛ¹ ×ÑÒØÓÒÓÚ¸ØÖØÒÑØÖÜ¸ÏÝÐÖÓÙÔ¸ÒØ×ØÓÖÐÒÑ¹ NÖÑÒØ×ÑÓÖÐÐÚÐÙ×ÓNºÌÑÓÙÐÖÓÖÑ× 0ÚÑÙÐØÔÐØÝm(tη 0 ÒÖÝ×ÑÔÐÖÓÓØ×ÓÖØG ½ ( ) ( ) ( ) 2 1 0 −1 0 1 1 = , δ 2 = , δ 3 = 1 0 −1 0 1 2 PGL(2, Z) = W(A 1,II ) ⋊ S 3 , 1 − ∑ t∈N m(tη 0 ) q n = √ gρ (τ) η(τ) 3 1,II
ÚÖ¸ÖÖÒØÖÓÑÓØÖºÌÖÒÒØÒÓÑÒØÓÖÒØØ××Ò ÔØÖºÊ×ÙÐØ×ÓØÌ×× ÑÙÐØÔÐ×ÓØÓÖÑtη¸ÓØÐØ¹Ð×ÑÔÐÖÓÓØ×η¸ÓÖÖÒØÚÐÙ×ÓNÖ ØÓÒØ×ÓØØÖÑ×ÓÙÖÖÒÒØÜÔÒ×ÓÒ¸ÛÖ×ØØÖÑ×ØÑ×ÐÚ× ÙÒÖÓÒÓÒºÌÒÖØÒÙÒØÓÒ×ÓØÑÙÐØÔÐØÝØÓÖ×ÓØÚÖÓÙ× ÚÒÒØÖÑ×Ó×ÒÐÓÖÑÙÐ ´ºµ ) ÝÖØ×ÒÓÒÆÙÐÒ℄ 1ØÓÖÑÙÐÖÔÖÓÙ×ØÖ×ÙÐØÓØÒ )×ØÓÖÓÐÒ m(tη 0 ) q t = ψ k/2,1/2 (τ, z) . ÖÓÑØÓÚÛ×ØÔØØÖÒÒØÔÖÓÖ××ÓÒÓØm(η 0 ÖÓÙÔZ NÚÖ×ºÓÖÜÑÔÐ¸ÓÖN ´ºµ = 2¸ØÚ× ÛØØÑÙÐØÔÐØÝÓØÐØ¹ÐÖÓÓØ×Ò4º ´ºµ ÛÖØÑÙÐØÔÐØÝÓØÐØ¹ÐÖÓÓØ××9¸ÛÐÓÖN = ×Ù¹ÐÖ×ÖÓØÒÝØÓÖÓÐÒØÓÒÓÒØÅÓÒ×ØÖÄÐÖº Ì×××ÑÐÖØÓÛØØØÛ×ØÒÓÑÒØÓÖÓÖÑÙÐÓÆÑÒÒ¼℄ÛÖØ 2ÓÖÖØÓÒ×ØÓØ×ØÖÒØÚØÓÒÒØÀÄÓÖÓÐ×º NÓÖÓÐÀÄ×ØÖÒ×º (Z)ÒÖØÒØ 4¹ •ÁÒ℄ØÑÓÙÐÖÔÖÓÔÖØ×ÓØÑÓÙÐÖÓÖÑ×∆ k ÃÅÄ×ÙÔÖÐÖ×G NÓØZ ÌÑÓÙÐÖÓÖÑ×˜Φk (Z)ÒΦ (Z)ÒÖØ¸Ö×ÔØÚÐÝ¸ØÒÖÝÓØ1 k (Z)Ö×ÔØÚÐÝ¸ØØÓÙÖ× (Z)¸ØØÖ ÈË×ØØ×ÒØR ÒÆÙÐÒºÁÒ℄ØÑÓÙÐÖÓÖÑ×ØØÓÙÖ×ØÒÓÑÒØÓÖÒØØ×ÓØ ×ÜÔÐÒÒØÔÖÚÓÙ×ÔØÖ¸Ø×ØÑÓÙÐÖÓÖÑ×∆ k (Z)Ò˜∆k 1ÝÖØ×ÒÓ (Z)Û× Ø×ÕÙÖÖÓÓØ×³ÓØÑÓÙÐÖÓÖÑ×Φ (Z)ÓÖÒØÖÔÖØÒØÑ×ØÒÓÑÒØÓÖÓ k (Z)Ò˜Φk ØÒÓÑÒØÓÖÒØØ×ÓÃÅÄ×ÙÔÖÐÖ×ºÌÑÓÙÐÖÓÖÑ∆ NÛÖÓÒ×ØÖÙØºÀÓÛÚÖ¸ÓÒÒ×ØÓ 5 ÓÙÒØÓØÒÓÑÒØÓÖÒØØÝÓØÃÅÄ×ÙÔÖÐÖG ÑÐÝÓÃÅÄ×ÙÔÖÐÖ×G ½ ØÑÓÙÐÖÔÖÓÔÖØ×ÓØ∆ k 1 − ∑ t∈N θ 1 (τ, z) 1 − ∑ t∈N ( 1 − ∑ t∈N m(tη 0 )q t = ∏ k∈N(1 − q k ) 9 = m(tη 0 ) q t = ∏ k∈N(1 − q k )(1 − q 2k ) 4 = √ f (10) (τ) η(τ) 3 √ f (6) (τ) η(τ) 3
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