The maximum subsequence product of a run of non-zero numbers is either the product of all the numbers (if there's an even number of negative numbers), or it's the greater of the product of all the numbers after the first negative number, and the product of all the numbers up to the last negative number.

This gives you an O(N) solution: break the sequence into runs of non-zero numbers and apply the rule in the first paragraph to each. Pick the max of these.

C-like Python code for this:

```
def prod(seq, a, b):
r = 1
for i in xrange(a, b):
r *= seq[i]
return r
def maxprodnon0(seq, a, b):
firstneg = -1
negs = 0
for i in xrange(a, b):
if seq[i] >= 0: continue
negs += 1
if firstneg < 0:
firstneg = i
lastneg = i
if negs % 2 == 0: return prod(seq, a, b)
return max(prod(seq, firstneg + 1, b), prod(seq, a, lastneg))
def maxprod(seq):
best = 0
N = len(seq)
i = 0
while i < N:
while i < N and seq[i] == 0:
i += 1
j = i
while j < N and seq[j] != 0:
j += 1
best = max(best, maxprodnon0(seq, i, j))
i = j
return best
for case in [2,5,-1,-2,-4], [1,2,0,-4,5,6,0,7,1], [1,2,0,-4,5,6,-1,-1,0,7,1]:
print maxprod(case)
```