Jellyfish is playing a one-player card game called "Slay the Spire". There are $$$n$$$ cards in total numbered from $$$1$$$ to $$$n$$$. The $$$i$$$-th card has power $$$c_i$$$.

There is a binary string $$$s$$$ of length $$$n$$$. If $$$s_i = \texttt{0}$$$, the $$$i$$$-th card is initially in the draw pile. If $$$s_i = \texttt{1}$$$, the $$$i$$$-th card is initially in Jellyfish's hand.

Jellyfish will repeat the following process until either her hand or the draw pile is empty.

1. Let $$$x$$$ be the power of the card with the largest power in her hand.
2. Place a single card with power $$$x$$$ back into the draw pile.
3. Randomly draw $$$x$$$ cards from the draw pile. All subsets of $$$x$$$ cards from the draw pile have an equal chance of being drawn. If there are fewer than $$$x$$$ cards in the draw pile, Jellyfish will draw all cards.

At the end of this process, find the probability that Jellyfish can empty the draw pile, modulo $$$1\,000\,000\,007$$$.

Formally, let $$$M=1\,000\,000\,007$$$. It can be shown that the answer can be expressed as an irreducible fraction $$$\frac{p}{q}$$$, where $$$p$$$ and $$$q$$$ are integers and $$$q \not \equiv 0 \pmod{M}$$$. Output the integer equal to $$$p \cdot q^{-1} \bmod M$$$. In other words, output such an integer $$$x$$$ that $$$0 \le x < M$$$ and $$$x \cdot q \equiv p \pmod{M}$$$.