Metadata-Version: 2.1
Name: py2opt
Version: 1.1.0
Summary: How to solve the traveling salesman problem with the 2-opt algorithm
Home-page: https://github.com/pdrm83/py2opt
Author: Pedram Ataee
Author-email: pedram.ataee@gmail.com
License: MIT
Description: # 2-Opt Search Algorithm 
        
        In optimization, 2-opt is a simple local search algorithm with special swapping mechanism that suits well to solve the 
        traveling salesman problem. This algorithm is sensitive to the initial point of search, i.e., its final results get 
        changed by different initial points. 2-opt runs very fast such that a tsp with 120 cities can be solved in less than 
        5 sec on the intel core i7. To get a more reliable result, you should run the 2-opt with different randomized initial 
        points for enough number of times. One more thing, the travelling salesman problem has many applications in real world 
        such as logistic planning or DNA sequencing. So, having a fast and simple method to solve the TSP is valuable. 
        
         
        ## Library
        The library requires the following libraries:
        
        * numpy
        * math
        * time
        * random2
        * itertools
        
        ## Install
        
        It can be installed using pip:
        ```python
        pip install py2opt
        ```
        
        ## Usage
        
        To use this library, you must have a distance matrix showing the pair distance among all nodes. Then, the first thing 
        to do is create an instance of the RouteFinder class. 
        
        ```python
        from py2opt.routefinder import RouteFinder
        
        nodes = ['A', 'B', 'C', 'D']
        dist_mat = [[0, 2, 5, 3], [2, 0, 7, 2], [5, 7, 0, 1], [3, 9, 1, 0 ]]
        route_finder = RouteFinder(dist_mat, nodes)
        best_distance, best_route = route_finder.solve()
        
        print(best_distance)
        11
        print(best_route)
        ['A', 'D', 'C', 'B']
        ```
        The solver finds out the optimum order (re: minimum total distance traveled) in which the nodes must be visited along 
        with the total distance traveled.
        
        And that's pretty much it!
        
        
Platform: UNKNOWN
Classifier: License :: OSI Approved :: MIT License
Classifier: Programming Language :: Python :: 3
Classifier: Programming Language :: Python :: 3.7
Description-Content-Type: text/markdown
