I want to implement 2SAT problem for 100000 literals. So there would be 200000 vertices. So I am stuck on having a array of all reachable vertices from each vertex, space complexity of O(200000^2)
which is infeasible So please suggest a solution for this. And please throw some light on efficient implementation of 2SAT problem.



From wikipedia:
I won't pretend to understand most of that paragraph, but it would appear that there is an algorithm which can be used to solve the 2SAT problem, and it is described within that referenced document (A lineartime algorithm for testing the truth of certain quantified boolean formulas). It can apparently be purchased online for about $20 USD. I'm Not sure if that's helpful or not, but there it is! update: A free PDF of the same document can be found here. Credit goes to liori for the find. 

This whole thread is a bit messed up. Yes, one can solve 2sat in linear time, but no  you can not solve it for that many variables. The time to solve 2sat is linear with respect to the number of the implication, which for 200 000 variables could reach up to (200000*199999)/2 and furthermore if you use this solution you will need about the same amount of memory. There is another solution(not using strongly connected components that is slower but doesn't need that much memory). 

