This is a homework exercise from Steven Skiena's "The algorithm design manual" 2nd edition, p 143.

Suppose that you are given a sorted sequence of distinct integers

`{A1,A2,...An}`

, drawn from`1`

to`m`

where`n < m`

. Give an`O(lgN)`

algorithm to find an integer`<= m`

that is not present in`A`

. For full credit, find the smallest such integer.

A sorted sequence, and `O(lgN)`

both suggest a binary search algorithm. The only way I could think of is to run through numbers from `1`

through `m`

, and for each number do a binary search to see if it exists in sequence `A`

. But that means `O(mlgN)`

, not really `O(lgN)`

.

`A[i]=i`

. – Raymond Chen Dec 10 '12 at 1:31