\(fib[1]=1,fib[2]=1,fib[n]=fib[n-1]+fib[n-2](n>=3)\)
\(h[1]=a,h[2]=b,h[n]=b*fib[n-1]+a*fib[n-2](n>=3)\)
\(h[n]=h[n-1]+h[n-2]\)
\(h[n]=h[n-2]+h[n-3]+h[n-2]\)
\(h[n]=h[n-4]+h[n-4]+h[n-3]+h[n-2]\)
\(h[n]=\sum_{i=1}^{n-2}h[i] + h[2]\)
\(\sum_{i=1}^{n}h[i] = h[n+2]-h[2]\)
性质1:对于一个满足斐波那契性质的数列,如果我们已知它的前两项,我们可以O(1)的得到它的任意一项和任意前缀和!
性质2:两个满足斐波那契性质的数列相加后,依然是斐波那契数列。前两项的值分别为两个的和。
fib[a+b]=fib[a?1]×fib[b]+fib[a]×fib[b+1]
fib[i?l+1]=fib[i]×fib[?l]+fib[i+1]×fib[1?l]
原文:https://www.cnblogs.com/Cwolf9/p/10274964.html