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Time Limit: 2 s Memory Limit: 256 MB Total points: 100
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# 1702. Train Tracking 2

Statistics

Every day the express train goes past the farm. It has N carriages (1N105), each with a positive integer label between 1 and 109; different carriages may have the same label.

Usually, Bessie watches the train go by, tracking the carriage labels. But today is too foggy, and Bessie can't see any of the labels! Luckily, she has acquired the sliding window minimums of the sequence of carriage labels, from a reputable source in the city. In particular, she has a positive integer K, and NK+1 positive integers c1,,cN+1K, where ci is the minimum label among carriages i,i+1,,i+K1.

Help Bessie figure out the number of ways to assign a label to each carriage, consistent with the sliding window minimums. Since this number may be very large, Bessie will be satisfied if you find its remainder modulo 109+7.

Bessie's information is completely reliable; that is, it is guaranteed that there is at least one consistent way to assign labels.

Input Format

The first line consists of two space-separated integers, N and K. The subsequent lines contain the sliding window minimums c1,,cN+1K, one per line.

Output Format

A single integer: the number of ways, modulo 109+7, to assign a positive integer not exceeding 109 to each carriage, such that the minimum label among carriages i,i+1,,i+K1 is ci for each 1iNK+1.

Sample Input

4 2
999999998
999999999
999999998

Output Format

3

Problem credits: Dhruv Rohatgi