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"A tourist want to go from Liverpool to Sydney, visiting a number of other cities in the process.

for each pair of cities, he can travel by car, train or ferry, each option has a Cost and Time.

the goal is to go to syndey,traversing all cities in the process whilst keeping the time and cost to a minimum."

1-how do i verify that this problem is NP? given total time T and total cost C?
i.e: if i have 5 nodes, connected by 4 edges, each edge has 3 options (car,ferry,train) each option has Cost and time

how do i process the constraints? do i just try all permutations ?

2-i need guidance on actual solution, i do realize this is a subset of the Minimum spanning tree , but now i have 2 constraints, time and cost..how to tackle that ?

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closed as off topic by Mike Bantegui, richsage, Neal, Fabrício Matté, ThiefMaster Aug 8 '12 at 21:11

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Sounds a bit like homework to me.... –  richsage Aug 8 '12 at 18:38
    
Agree - definitely homework; in addition, he should explicitly point what his solution is and where he's stuck. –  Alessandro Santini Aug 8 '12 at 18:44
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You want to minimize the cost or the time? you have to define an order relation between pairs of (time,cost). –  barak1412 Aug 8 '12 at 18:49
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no such thing both cost AND time. to go by bicycle is cheapest, to go by plain is fastest. –  Will Ness Aug 8 '12 at 18:53
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@AlessandroSantini "he"'s a she. :) Haven't you heard about Salma Hayek? If not, the identicon is right there. :) –  Will Ness Aug 8 '12 at 18:56

1 Answer 1

up vote 2 down vote accepted

This kind of problem is solved with the Hungarian algorithm

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