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Neural Network to solve Traveling Salesman Problem Amit Goyal 01005009 Koustubh Vachhani 01005021 Ankur Jain 01D05007.

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Presentation on theme: "Neural Network to solve Traveling Salesman Problem Amit Goyal 01005009 Koustubh Vachhani 01005021 Ankur Jain 01D05007."— Presentation transcript:

1 Neural Network to solve Traveling Salesman Problem Amit Goyal 01005009 Koustubh Vachhani 01005021 Ankur Jain 01D05007

2 Roadmap Hopfield Neural Network Solving TSP using Hopfield Network Modification of Hopfield Neural Network Solving TSP using Concurrent Neural Network Comparison between Neural Network and SOM for solving TSP

3 Background Neural Networks Computing device composed of processing elements called neurons Processing power comes from interconnection between neurons Various models are Hopfield, Back propagation, Perceptron, Kohonen Net etc

4 Associative memory Produces for any input pattern a similar stored pattern Retrieval by part of data Noisy input can be also recognized OriginalDegradedReconstruction

5 Hopfield Network Recurrent network Feedback from output to input Fully connected Every neuron connected to every other neuron

6 Hopfield Network Symmetric connections Connection weights from unit i to unit j and from unit j to unit i are identical for all i and j No self connection, so weight matrix is 0- diagonal and symmetric Logic levels are +1 and -1

7 Computation  For any neuron i, at an instant t input is Σ j = 1 to n, j≠i w ij σ j (t) σ j (t) is the activation of the j th neuron  Threshold function θ = 0  Activation σ i (t+1)=sgn(Σ j=1 to n, j≠i w ij σ j (t)) where Sgn(x) = +1 x>0 Sgn(x) = -1 x<0

8 Modes of operation Synchronous All neurons are updated simultaneously Asynchronous Simple : Only one unit is randomly selected at each step General : Neurons update themselves independently and randomly based on probability distribution over time.

9 Stability Issue of stability arises since there is a feedback in Hopfield network May lead to fixed point, limit cycle or chaos Fixed point : unique point attractor Limit cycles : state space repeats itself in periodic cycles Chaotic : aperiodic strange attractor

10 Procedure Store and stabilize the vector which has to be part of memory. Find the value of weight w ij, for all i, j such that : is stable in Hopfield Network of N neurons.

11 Weight learning Weight learning is given by w ij = 1/(N-1) σ i σ j 1/(N-1) is Normalizing factor σ i σ j derives from Hebb’s rule If two connected neurons are ON then weight of the connection is such that mutual excitation is sustained. Similarly, if two neurons inhibit each other then the connection should sustain the mutual inhibition.

12 Multiple Vectors If multiple vectors need to be stored in memory like ………………………………. Then the weight are given by: w ij = 1/(N-1) Σ m=1 to p σ i m σ j m

13 Energy Energy is associated with the state of the system. Some patterns need to be made stable this corresponds to minimum energy state of the system.

14 Energy function Energy at state σ’ = E(σ’) = -½ Σ i Σ j≠i w ij σ i σ j Let the p th neuron change its state from σ p initial to σ p final so E initial = -½ Σ j≠p w pj σ p initial σ j + T E final = -½ Σ j≠p w pj σ p final σ j + T ΔE = E final – E initial T is independent of σ p

15 Continued… ΔE = - ½ (σ p final - σ p initial ) Σ j≠p w pj σ j i.e. ΔE = -½ Δσ p Σ j≠p w pj σ j Thus: ΔE = -½ Δσ p x (netinput p )  If p changes from +1 to -1 then Δσ p is negative and netinput p is negative and vice versa.  So, ΔE is always negative. Thus energy always decreases when neuron changes state.

16 Applications of Hopfield Nets Hopfield nets are applied for Optimization problems. Optimization problems maximize or minimize a function. In Hopfield Network the energy gets minimized.

17 Traveling Salesman Problem Given a set of cities and the distances between them, determine the shortest closed path passing through all the cities exactly once.

18 Traveling Salesman Problem One of the classic and highly researched problem in the field of computer science. Decision problem “Is there a tour with length less than k" is NP - Complete Optimization problem “What is the shortest tour?” is NP - Hard

19 Hopfield Net for TSP N cities are represented by an N X N matrix of neurons Each row has exactly one 1 Each column has exactly one 1 Matrix has exactly N 1’s σ kj = 1 if city k is in position j σ kj = 0 otherwise

20 Hopfield Net for TSP For each element of the matrix take a neuron and fully connect the assembly with symmetric weights Finding a suitable energy function E

21 Determination of Energy Function E function for TSP has four components satisfying four constraints Each city can have no more than one position i.e. each row can have no more than one activated neuron E 1 = A/2 Σ k Σ i Σ j≠i σ ki σ kj A - Constant

22 Energy Function (Contd..) Each position contains no more than one city i.e. each column contains no more than one activated neuron E 2 = B/2 Σ j Σ k Σ r≠k σ kj σ rj B - constant

23 Energy Function (Contd..) There are exactly N entries in the output matrix i.e. there are N 1’s in the output matrix E 3 = C/2 (n - Σ k Σ i σ ki ) 2 C - constant

24 Energy Function (cont..) Fourth term incorporates the requirement of the shortest path E 4 = D/2 Σ k Σ r≠k Σ j d kr σ kj ( σ r(j+1) + σ r(j-1) ) where d kr is the distance between city-k and city-r E total = E 1 + E 2 + E 3 + E 4

25 Energy Function (cont..)  Energy equation is also given by E= -½Σ ki Σ rj w (ki)(rj) σ ki σ rj σ ki – City k at position i σ rj – City r at position j  Output function σ ki σ ki = ½ ( 1 + tanh(u ki /u 0 )) u 0 is a constant u ki is the net input

26 Weight Value  Comparing above equations with the energy equation obtained previously W (ki)(rj) = -A δ kr (1 – δ rj ) - Bδ ij (1 – δ kr ) – C – Dd kr (δ j(i+1) + δ j(i-1) )  Kronecker Symbol : δ kr  δ kr = 1 when k = r  δ kr = 0 when k ≠ r

27 Observation Choice of constants A,B,C and D that provide a good solution vary between Always obtain legitimate loops (D is small relative to A, B and C) Giving heavier weights to the distances (D is large relative to A, B and C)

28 Observation (cont..) Local minima Energy function full of dips, valleys and local minima Speed Fast due to rapid computational capacity of network

29 Concurrent Neural Network Proposed by N. Toomarian in 1988 It requires N(log(N)) neurons to compute TSP of N cities. It also has a much higher probability to reach a valid tour.

30 Objective Function  Aim is to minimize the distance between city k at position i and city r at position i+1 E i = Σ k≠r Σ r Σ i δ ki δ r(i+1) d kr Where δ is the Kronecers Symbol

31 Cont … E i = 1/N 2 Σ k≠r Σ r Σ i d kr Π i= 1 to ln(N) [1 + (2ע i – 1) σ ki ] [1 + (2 µ i – 1) σ ri ] Where (2 µ i – 1) = (2ע i – 1) [1 – Π j= 1 to i-1 ע i ] Also to ensure that 2 cities don ’ t occupy same position E error = Σ k≠r Σ r δ kr

32 Solution E error will have a value 0 for any valid tour. So we have a constrained optimization problem to solve. E = E i + λ E error λ is the Lagrange multiplier to be calculated form the solution.

33 Minimization of energy function Minimizing Energy function which is in terms of σ ki Algorithm is an iterative procedure which is usually used for minimization of quadratic functions The iteration steps are carried out in the direction of steepest decent with respect to the energy function E

34 Minimization of energy function Differentiating the energy dU ki /dt = - δE/ δ σ ki = - δE i / δ σ ki - λδE error / δ σ ki dλ/dt = ± δE/ δλ = ± E error σ ki = tanh(αU ki ), α – const.

35 Implementation Initial Input Matrix and the value of λ is randomly selected and specified At each iteration, new value of σ ki and λ is calculated in the direction of steepest descent of energy function Iterations will stop either when convergence is achieved or when the number of iterations exceeds a user specified number

36 Comparison – Hopfield vs Concurrent NN Converges faster than Hopfield Network Probability to achieve valid tour is higher than Hopfield Network Hopfield doesn’t have systematic way to determine the constant terms.

37 Comparison – SOM and Concurrent NN Data set consists of 52 cities in Germany and its subset of 15 cities. Both algorithms were run for 80 times on 15 city data set. 52 city dataset could be analyzed only using SOM while Concurrent Neural Net failed to analyze this dataset.

38 Result Concurrent neural network always converged and never missed any city, where as SOM is capable of missing cities. Concurrent Neural Network is very erratic in behavior, whereas SOM has higher reliability to detect every link in smallest path. Overall Concurrent Neural Network performed poorly as compared to SOM.

39 Shortest path generated Concurrent Neural Network (2127 km)Self Organizing Maps (1311km)

40 Behavior in terms of probability Concurrent Neural Network Self Organizing Maps

41 Conclusion Hopfield Network can also be used for optimization problems. Concurrent Neural Network performs better than Hopfield network and uses less neurons. Concurrent and Hopfield Neural Network are less efficient than SOM for solving TSP.

42 References N. K. Bose and P. Liang, ”Neural Network Fundamentals with Graphs, Algorithms and Applications”, Tata McGraw Hill Publication, 1996 P. D. Wasserman, “Neural computing: theory and practice”, Van Nostrand Reinhold Co., 1989 N. Toomarian, “A Concurrent Neural Network algorithm for the Traveling Salesman Problem”, ACM Proceedings of the third conference on Hypercube concurrent computers and applications, pp. 1483-1490, 1988.

43 References R. Reilly, “Neural Network approach to solving the Traveling Salesman Problem”, Journals of Computer Science in Colleges, pp. 41-61,October 2003 Wolfram Research inc., “Tutorial on Neural Networks”, http://documents.wolfram.com/applications/neuralnetwor ks/NeuralNetworkTheory/2.7.0.html, 2004 http://documents.wolfram.com/applications/neuralnetwor ks/NeuralNetworkTheory/2.7.0.html Prof. P. Bhattacharyya, “Introduction to computing with Neural Nets”,http://www.cse.iitb.ac.in/~pb/Teaching.html.http://www.cse.iitb.ac.in/~pb/Teaching.html

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45 NP-complete NP-hard When a decision version of a combinatorial optimization problem is proved to belong to the class of NP-complete problems, which includes well-known problems such as satisfiability,traveling salesman, the bin packing problem, etc., then the optimization version is NP-hard. optimization problemNP-completetraveling salesmanbin packing problem

46 NP-complete NP-hard “Is there a tour with length less than k" is NP-complete: It is easy to determine if a proposed certificate has length less than k certificate The optimization problem : "what is the shortest tour?", is NP-hard Since there is no easy way to determine if a certificate is the shortest.

47 Path lengths Concurrent Neural NetworkSelf Organizing Maps


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