Welcome to OGeek Q&A Community for programmer and developer-Open, Learning and Share
Welcome To Ask or Share your Answers For Others

Categories

0 votes
538 views
in Technique[技术] by (71.8m points)

algorithm - Find out which combinations of numbers in a set add up to a given total

I've been tasked with helping some accountants solve a common problem they have - given a list of transactions and a total deposit, which transactions are part of the deposit? For example, say I have this list of numbers:

1.00
2.50
3.75
8.00

And I know that my total deposit is 10.50, I can easily see that it's made up of the 8.00 and 2.50 transaction. However, given a hundred transactions and a deposit in the millions, it quickly becomes much more difficult.

In testing a brute force solution (which takes way too long to be practical), I had two questions:

  1. With a list of about 60 numbers, it seems to find a dozen or more combinations for any total that's reasonable. I was expecting a single combination to satisfy my total, or maybe a few possibilities, but there always seem to be a ton of combinations. Is there a math principle that describes why this is? It seems that given a collection of random numbers of even a medium size, you can find a multiple combination that adds up to just about any total you want.

  2. I built a brute force solution for the problem, but it's clearly O(n!), and quickly grows out of control. Aside from the obvious shortcuts (exclude numbers larger than the total themselves), is there a way to shorten the time to calculate this?

Details on my current (super-slow) solution:

The list of detail amounts is sorted largest to smallest, and then the following process runs recursively:

  • Take the next item in the list and see if adding it to your running total makes your total match the target. If it does, set aside the current chain as a match. If it falls short of your target, add it to your running total, remove it from the list of detail amounts, and then call this process again

This way it excludes the larger numbers quickly, cutting the list down to only the numbers it needs to consider. However, it's still n! and larger lists never seem to finish, so I'm interested in any shortcuts I might be able to take to speed this up - I suspect that even cutting 1 number out of the list would cut the calculation time in half.

Thanks for your help!

See Question&Answers more detail:os

与恶龙缠斗过久,自身亦成为恶龙;凝视深渊过久,深渊将回以凝视…
Welcome To Ask or Share your Answers For Others

1 Reply

0 votes
by (71.8m points)

This special case of the Knapsack problem is called Subset Sum.


与恶龙缠斗过久,自身亦成为恶龙;凝视深渊过久,深渊将回以凝视…
OGeek|极客中国-欢迎来到极客的世界,一个免费开放的程序员编程交流平台!开放,进步,分享!让技术改变生活,让极客改变未来! Welcome to OGeek Q&A Community for programmer and developer-Open, Learning and Share
Click Here to Ask a Question

1.4m articles

1.4m replys

5 comments

57.0k users

...