【答案】(1)A1:7,5,4,3,1�;A2:6,5,4,3,2.(2)見解析(3)見解析
【解析】試題分析:(1)由A0:2,6,4,8,求得T1(A0)�,再通過
求解。(2)設(shè)有窮數(shù)列A,求得T1(A)����,再求得S(T1(A)),兩者作差比較���。(3)設(shè)A是每項(xiàng)均為非負(fù)整數(shù)的數(shù)列a1�����,a2�,…�����,
����,在存在1≤i<j≤n�����,使得
時(shí)��,交換數(shù)列A的第i項(xiàng)與第j項(xiàng)得到數(shù)列B�����,,在存在1≤m<n���,使得am+1=am+2=an=0條件下,若記數(shù)列a1��,a2���,…為C����,
Ak+1=T2(T1(Ak)), S(Ak+1)≤S(T1(Ak)),由S(T1(Ak))=S(Ak)����,得到S(Ak+1)≤S(Ak)���,S(Ak)是大于2的整數(shù)�,所以經(jīng)過有限步后,必有S(Ak)=S(Ak+1)=S(Ak+2)=0.
試題解析: (1) A0:2,6,4,8���;T1(A0):4,1,5,3,7��,A1:7,5,4,3,1���;T1(A1):5,6,4,3,2,0,
∴A2:6,5,4,3,2.
(2)證明 設(shè)每項(xiàng)均是正整數(shù)的有窮數(shù)列A為a1�����,a2�����,…����,
則T1(A)為n,a1-1�����,a2-1,…���,-1�����,
從而S(T1(A))=2[n+2(a1-1)+3(a2-1)+…+(n+1)(-1)]+n2+(a1-1)2+(a2-1)2+…+(-1)2.
又S(A)=2(a1+2a2+…+nan)+
+
+…+
���,
所以S(T1(A))-S(A)=2[n-2-3-…-(n+1)]+2(a1+a2+…+an)+n2-2(a1+a2+…+)
+n=-n(n+1)+n2+n=0,
故S(T1(A))=S(A).
(3)證明:設(shè)A是每項(xiàng)均為非負(fù)整數(shù)的數(shù)列a1�,a2,…����,
當(dāng)存在1≤i<j≤n,使得時(shí)����,交換數(shù)列A的第i項(xiàng)與第j項(xiàng)得到數(shù)列B,
則S(B)-S(A)=
當(dāng)存在1≤m<n�,使得am+1=am+2=an=0時(shí),若記數(shù)列a1�����,a2���,…為C����,
則S(C)=S(A).
所以S(T2(A))≤S(A).
從而對(duì)于任意給定的數(shù)列A0����,由Ak+1=T2(T1(Ak))(k=0,1,2),
可知S(Ak+1)≤S(T1(Ak)).
又由(2)可知S(T1(Ak))=S(Ak)�,
所以S(Ak+1)≤S(Ak).
即對(duì)于k∈N,要么有S(Ak+1)=S(Ak)���,
要么有S(Ak+1)≤S(Ak)-1.
因?yàn)?/span>S(Ak)是大于2的整數(shù)����,所以經(jīng)過有限步后�,
必有S(Ak)=S(Ak+1)=S(Ak+2)=0.
即存在正整數(shù)K,當(dāng)k≥K時(shí)��,S(Ak+1)=S(A).
