Warning This is a bit convoluted but does the job. I will use an example to explain it.
expensive_function = math.sin
infinite generator = collections.count(0.1,0.1)
[z for z in (y if y < 5 else next(iter())
for y in (math.sin(x) for x in itertools.count(0.1,0.1)))]
So your problem boils down to
[z for z in (y if y < 0.5 else next(iter()) \
for y in (expensive_function(x) for x in generator))]
The trick is to force a
StopIteration from a generator and nothing elegant than
expensive_function is only called once per iteration.
Extend the Infinite Generator with a Finite Generator, with the Stop Condition.
As the generator won't allow
raise StopIteration, we opt for a convoluted way i.e.
And now you have a Finite Generator, which can be used in a List Comprehension
As OP was concerned with the application of the above method for a non-monotonic function here is a fictitious non-monotonic function
Expensive Non-Monotonic Function
f(x) = random.randint(1,100)*x
Stop Condition =
[z for z in (y if y < 7 else next(iter()) for y in
(random.randint(1,10)*x for x in itertools.count(0.1,0.1)))]
sin in true sense is non-monotonic over the entire range