Use of the word "convergent"

Solution 1:

Without going into whether it is correct or not (I think it's acceptable), I can tell you why mathematicians use it. Sometimes, we want to emphasise the value of the limit. In such cases, we say "This sequence converges to 0" or "The limit of this sequence is 0". But sometimes, when we're more concerned with the analysis of the sequence (whether it is a convergent sequence, or divergent, or what), we want to emphasise the fact that it converges, rather than its limit. In such cases, instead of saying

This sequence is convergent, and its limit is 0"

or

This sequence is convergent, and it converges to 0"

we (or some mathematicians) use a shortcut and say, equivalently,

"This sequence is convergent to 0."

Solution 2:

We usually say

The sequence converges to 0,

but it is also correct to say

The sequence is convergent to 0.

Having said that, we know that language usage in technical areas is different from that in everyday life. For example, we say the triangles are incongruent to mean they are not congruent. However incongruent is not a standard word in everyday use, and the opposite of congruent in the everyday sense is incongruous, which would not be used to describe triangles.

It all boils down to accepted conventions in technical usage then. Grammatically, convergent to 0 is an adjectival phrase, with the adjective convergent modified by to 0.

Solution 3:

I believe it is technically correct, but stylistically I prefer the phrase "convergent toward 0".