My first thought was:  eliminate all numbers ending in 0 or 5 to get rid of the trailing zeros.

But the only single digit multipliers yielding a terminal 1 are 1*1, 9*9, 3*7.
So eliminate everything except factors that end in 1, 3, 7, or 9.

This will result in:

203 1s

203 3s

202 7s and

202 9s

We can keep all these factors except for one of those ending in 3, because there must be an equal number of 3s and 7s (and also an even number of 9s).
203 + 203 + 202 + 202 - 1 = 809 factors
So we erase 2023 - 809 = 1214.

Erase 1214 of the numbers.