Suggestions(2)
Exact(60)
for large t.
This implies that (B t)) is bounded for large t.
Now let z(t) < 0 for t ≥ T. Suppose that y(t) < 0 for large t.
By Lemma 4, we find that x is identically zero for large t.
Here we consider (1) in case r ( t ) > 0 for large t.
and for the variance in Eq. (35) for large t we find (64).
The proof for the case when x t) < 0 for large t is analog.
Since q ( t ) > 0, every eventually positive solution of (2) is nondecreasing for large t.
Since λ ≥ 1, then using the change of the order of integration, we get a contradiction for large t.
For a certain r, the SIR value may not be higher than T d for large T d.
Since z is positive and increasing, there exists ℓ > 0 such that z ( t ) ≥ ℓ for large t.
Write better and faster with AI suggestions while staying true to your unique style.
Since I tried Ludwig back in 2017, I have been constantly using it in both editing and translation. Ever since, I suggest it to my translators at ProSciEditing.

Justyna Jupowicz-Kozak
CEO of Professional Science Editing for Scientists @ prosciediting.com