There is a country with $$$n$$$ citizens. The $$$i$$$-th of them initially has $$$a_{i}$$$ money. The government strictly controls the wealth of its citizens. Whenever a citizen makes a purchase or earns some money, they must send a receipt to the social services mentioning the amount of money they currently have.
Sometimes the government makes payouts to the poor: all citizens who have strictly less money than $$$x$$$ are paid accordingly so that after the payout they have exactly $$$x$$$ money. In this case the citizens don't send a receipt.
You know the initial wealth of every citizen and the log of all events: receipts and payouts. Restore the amount of money each citizen has after all events.
The first line contains a single integer $$$n$$$ ($$$1 \le n \le 2 \cdot 10^{5}$$$) — the numer of citizens.
The next line contains $$$n$$$ integers $$$a_1$$$, $$$a_2$$$, ..., $$$a_n$$$ ($$$0 \le a_{i} \le 10^{9}$$$) — the initial balances of citizens.
The next line contains a single integer $$$q$$$ ($$$1 \le q \le 2 \cdot 10^{5}$$$) — the number of events.
Each of the next $$$q$$$ lines contains a single event. The events are given in chronological order.
Each event is described as either 1 p x ($$$1 \le p \le n$$$, $$$0 \le x \le 10^{9}$$$), or 2 x ($$$0 \le x \le 10^{9}$$$). In the first case we have a receipt that the balance of the $$$p$$$-th person becomes equal to $$$x$$$. In the second case we have a payoff with parameter $$$x$$$.
Print $$$n$$$ integers — the balances of all citizens after all events.
4 1 2 3 4 3 2 3 1 2 2 2 1
3 2 3 4
5 3 50 2 1 10 3 1 2 0 2 8 1 3 20
8 8 20 8 10
NoteIn the first example the balances change as follows: 1 2 3 4 $$$\rightarrow$$$ 3 3 3 4 $$$\rightarrow$$$ 3 2 3 4 $$$\rightarrow$$$ 3 2 3 4
In the second example the balances change as follows: 3 50 2 1 10 $$$\rightarrow$$$ 3 0 2 1 10 $$$\rightarrow$$$ 8 8 8 8 10 $$$\rightarrow$$$ 8 8 20 8 10