ÓÖÓÉÌõ¼þ(2),(3)£¬¸ù¾Ý°¢±´¶ûÒýÀíµÃ£º
k?n?1?un?pk(x)vk(x)¡Ü[|vn+1(x)|+2|vn+p(x)|]¦Å¡Ü3M¦Å.
Óɺ¯ÊýÏÊýÒ»ÖÂÊÕÁ²µÄ¿ÂÎ÷×¼ÔòÖª£¬?un(x)vn(x)ÔÚIÉÏÒ»ÖÂÊÕÁ².
¶¨Àí13.7£º(µÒÀû¿ËÀ×Åбð·¨)Éè
(1)?un(x)µÄ²¿·ÖºÍº¯ÊýÁÐSn(x)=?uk(x), (n=1,2,¡)ÔÚIÉÏÒ»ÖÂÓн磻
k?1n(2)¶ÔÓÚÿһ¸öx¡ÊI£¬{vn(x)}Êǵ¥µ÷µÄ£» (3)ÔÚIÉÏvn(x)?0 (n¡ú¡Þ)£¬ Ôò¼¶Êý?un(x)vn(x)ÔÚIÉÏÒ»ÖÂÊÕÁ².
Ö¤£ºÓÉÌõ¼þ(1)£¬´æÔÚÕýÊýM£¬¶ÔÒ»ÇÐx¡ÊI£¬ÓÐ|Sn(x)|¡ÜM£¬ ¡àµ±n,pΪÈκÎÕýÕûÊýʱ£¬
k?n?1?un?pk(x)=|Sn+p(x)-Sn(x)|<2M.
¶ÔÈκÎÒ»¸öx¡ÊI£¬ÓÉÌõ¼þ(2)¼°°¢±´¶ûÒýÀíµÃ£º
k?n?1?un?pk(x)vk(x)¡Ü2M[|vn+1(x)|+2|vn+p(x)|]
ÓÖÓÉÌõ¼þ(3)£¬?¦Å>0£¬?ÕýÊýN£¬Ê¹µÃµ±n>Nʱ£¬¶ÔÒ»ÇÐx¡ÊI£¬ ÓÐ|vn(x)|<¦Å. ¡à
k?n?1?un?pk(x)vk(x)<6M¦Å.
Óɺ¯ÊýÏÊýÒ»ÖÂÊÕÁ²µÄ¿ÂÎ÷×¼ÔòÖª£¬?un(x)vn(x)ÔÚIÉÏÒ»ÖÂÊÕÁ².
(?1)n(x?n)nÀý6£ºÖ¤Ã÷£ºº¯ÊýÏÊý?ÔÚ[0,1]ÉÏÒ»ÖÂÊÕÁ².n?1n (?1)nx?Ö¤£º¼Çun(x)=, vn(x)=??1??£¬Ôò?un(x)ÔÚ[0,1]ÉÏÒ»ÖÂÊÕÁ²£»
n?n?nÓÖ{vn(x)}µ¥µ÷Ôö£¬ÇÒ1¡Üvn(x)¡Üe, x¡Ê[0,1]£¬¼´{ vn(x)}ÔÚ[0,1]ÉÏÒ»ÖÂÓнç.
(?1)n(x?n)¸ù¾Ý°¢±´¶ûÅбð·¨ÖªÊý?ÔÚ[0,1]ÉÏÒ»ÖÂÊÕÁ².
nn?1
Àý7£ºÖ¤Ã÷£ºÈôÊýÁÐ{an}µ¥µ÷ÇÒÊÕÁ²ÓÚ0£¬Ôò¼¶Êý?ancosnxÔÚ[¦Á,2¦Ð-¦Á] (0<¦Á<¦Ð)ÉÏÒ»ÖÂÊÕÁ².
1??sinn???xn11111Ö¤£º¡ß?coskx=?2?- ¡Ü+¡Ü+, x¡Ê[¦Á,2¦Ð-¦Á]£¬
¦Á2xx22k?12sin2sin2sin222¡à¼¶Êý?cosnxµÄ²¿·ÖºÍº¯ÊýÁÐÔÚ[¦Á,2¦Ð-¦Á]ÉÏÒ»ÖÂÓнç. Áîun(x)=cosnx, vn(x)=an£¬¡ßÊýÁÐ{an}µ¥µ÷ÇÒÊÕÁ²ÓÚ0£¬ ¸ù¾ÝµÒÀû¿ËÀ×Åбð·¨Öª£¬¼¶Êý?ancosnxÔÚ[¦Á,2¦Ð-¦Á]ÉÏÒ»ÖÂÊÕÁ².
×¢£ºÖ»Òª{an}µ¥µ÷ÇÒÊÕÁ²ÓÚ0£¬ÄÇô¼¶Êý?ancosnxÔÚ²»°üº¬2k¦Ð (kΪÕûÊý)µÄÈκαÕÇø¼äÉ϶¼Ò»ÖÂÊÕÁ².
Ï°Ìâ
1¡¢ÌÖÂÛÏÂÁк¯ÊýÁÐÔÚËùʾÇø¼äDÉÏÊÇ·ñÒ»ÖÂÊÕÁ²»òÄÚ±ÕÒ»ÖÂÊÕÁ²£¬²¢ËµÃ÷ÀíÓÉ£º (1)fn(x)=x2?(2)fn(x)=
1, n=1,2,¡£¬D=(-1,1)£» 2nx, n=1,2,¡£¬D=R£» 221?nx1??(n?1)x?1£¬0?x??n?1, n=1,2,¡£» (3)fn(x)=?1?0£¬ ?x?1n?1?x(4)fn(x)=, n=1,2,¡£¬D=[0,+¡Þ)£»
nx(5)fn(x)=sin, n=1,2,¡£¬D=R.
nx2?½â£º(1)limfn(x)=nlim??¡Þn??¡Þ1 =|x|=f(x), x¡ÊD=(-1,1)£»ÓÖ n212112nsup|fn(x)-f(x)|=supx?2?|x|=sup¡Ü¡ú0(n¡ú¡Þ).
nx?Dnx?Dx?D1x2?2?|x|n¡àx2?1?|x| (n¡ú¡Þ)£¬x¡Ê(-1,1). n2(2)limfn(x)=nlim??¡Þn??¡Þx =0=f(x), x¡ÊD=R£»
1?n2x2xx1¡Ü=¡ú0(n¡ú¡Þ). 222nx2nx?D1?nxÓÖsup|fn(x)-f(x)|=supx?D¡à
x?0 (n¡ú¡Þ)£¬x¡ÊR.
1?n2x2n??¡Þ(3)µ±x=0ʱ£¬limfn(x)=1£»µ±0
?0£¬0?x?1sup|fn(x)-f(x)|=1¡Ù0. ¡àfn(x)ÔÚ[0,1]Éϲ»Ò»ÖÂÊÕÁ². ÓÖnlim??¡Þx?[0,1]1x?1£¬x?0 (4)limfn(x)=nlim=0=f(x), x¡ÊD=[0,+¡Þ)£»ÓÖ ??¡Þn??¡Þxnn??¡Þx?[0,+¡Þ)limsup|fn(x)-f(x)|=limsupx=+¡Þ, ¡àfn(x)ÔÚ[0,+¡Þ)Éϲ»Ò»ÖÂÊÕÁ². n??¡Þx?[0,+¡Þ)nsup|fn(x)-f(x)|=lim=0, ÔÚÈÎÒâ[0,a]ÉÏ£¬nlim??¡Þn??¡Þx?[0,a]an¡àfn(x)ÔÚ[0,+¡Þ)ÉÏÄÚ±ÕÒ»ÖÂÊÕÁ².
sin=0=f(x), x¡ÊD=R£»ÓÖ (5)limfn(x)=nlim??¡Þn??¡Þxnn??¡Þx?Rlimsup|fn(x)-f(x)|=limsupsinn??¡Þx?Rx=1, ¡àfn(x)ÔÚRÉϲ»Ò»ÖÂÊÕÁ². nxa¡Ünlim=0, ??¡Þnnsup|fn(x)-f(x)|=limsupsinÔÚÈÎÒâ[-a,a]ÉÏ£¬nlimn??¡Þ??¡Þx?[-a,a]x?[-a,a]¡àfn(x)ÔÚRÉÏÄÚ±ÕÒ»ÖÂÊÕÁ².
2¡¢Ö¤Ã÷£ºÉèfn(x)¡úf(x), x¡ÊD£¬ an¡ú0(n¡ú¡Þ) (an>0). Èô¶Ôÿһ¸öÕýÕûÊýnÓÐ|fn(x)-f(x)|¡Üan, x¡ÊD£¬Ôò{fn}ÔÚDÉÏÒ»ÖÂÊÕÁ²ÓÚf. Ö¤£º¡ß|fn(x)-f(x)|¡Üan, x¡ÊD£¬ÇÒan¡ú0(n¡ú¡Þ)£¬
sup|fn(x)-f(x)|= 0£¬¡àfn(x)?f(x) (n¡ú¡Þ)£¬x¡ÊD. ¡ànlim??¡Þx?[-a,a]
3¡¢ÅбðÏÂÁк¯ÊýÏÊýÔÚËùʾÇø¼äÉϵÄÒ»ÖÂÊÕÁ²ÐÔ£º
xnn(-1)n-1x2(1)?, x¡Ê[-r,r]£»(2)?, x¡ÊR£»(3)?xn, |x|>r>1£» (n-1)!(1?x2)nxn(-1)n-1x2(4)?2, x¡Ê[0,1]£»(5)?2, x¡ÊR£»(6)?, x¡ÊR. 2n-1nx?n(1?x)urnrnrxn½â£º(1)?x¡Ê[-r,r], ÓСÜ,¼Çun=,Ôòn?1=¡ú0(n¡ú¡Þ)£¬
(n-1)!(n-1)!unn(n-1)!rnxn¡à?ÊÕÁ²£¬¡à?ÔÚ[-r,r]ÉÏÒ»ÖÂÊÕÁ².
(n-1)!(n-1)!x2(2)¼Çun(x)=(-1), vn(x)=£¬Ôò¶ÔÈÎÒâµÄx¡ÊR£¬ÓÐ 2n(1?x)n-1
|?uk(x)|¡Ü1, (n=1,2,¡)£¬¼´{un(x)}µÄ²¿·ÖºÍº¯ÊýÁÐÔÚRÉÏÓн磻
k?1n