mincost: Implements Minimum Cost Algorithm to solve transportation...
In Somenath24/TransP: Implementation of Transportation Problem Algorithm
Description
Usage
Arguments
Details
Value
Examples
Description
This function implements Minimum Cost Algorithm to resolve transportation problem and get optimized allocation matrix
Usage
1
mincost(ex_matrix)
Arguments
ex_matrix
A cost matrix where last column must be the supply and last row must be the demand.
Input matrix should not have any missing values (NA), otherwise function will throw an error.
Details
This function takes a cost matrix (with Supply and Demand) and using North-West Corner approach gives
the allocation matrix as well as the calcualted optimized cost.
This function checks for degenerated problem but it can't resolve it. User need to resolve by seeing final allocation matrix.
If Supply and Demand are not equal Balance Supply/Demand will be stored in Dummy variable.
Value
A List which contrains the allocation matrix and the total optimized cost.
Examples
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## Not run:
#Input matrix where last row is the Demand and last column is the Supply
ex_matrix=data.frame(M1=c(13,10,25,17,210),M2=c(25,19,10,24,240),
M3=c(8,18,15,18,110),M4=c(13,5,14,13,80),M5=c(20,12,18,19,170),
Supply=c(430,150,100,130,810),
row.names = c("W1","W2","W3","W4","Demand"))
ex_matrix
M1 M2 M3 M4 M5 Supply
W1 13 25 8 13 20 430
W2 10 19 18 5 12 150
W3 25 10 15 14 18 100
W4 17 24 18 13 19 130
Demand 210 240 110 80 170 810
mincost(ex_matrix)
$Alloc_Matrix
M1 M2 M3 M4 M5
W1 140 140 110 0 40
W2 70 0 0 80 0
W3 0 100 0 0 0
W4 0 0 0 0 130
$Total_Cost
[1] 11570
## End(Not run)
Somenath24/TransP documentation built on May 9, 2019, 1:51 p.m.
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Description Usage Arguments Details Value Examples
Description
This function implements Minimum Cost Algorithm to resolve transportation problem and get optimized allocation matrix
Usage
1 | mincost(ex_matrix)
|
Arguments
ex_matrix |
A cost matrix where last column must be the supply and last row must be the demand. Input matrix should not have any missing values (NA), otherwise function will throw an error. |
Details
This function takes a cost matrix (with Supply and Demand) and using North-West Corner approach gives the allocation matrix as well as the calcualted optimized cost. This function checks for degenerated problem but it can't resolve it. User need to resolve by seeing final allocation matrix. If Supply and Demand are not equal Balance Supply/Demand will be stored in Dummy variable.
Value
A List which contrains the allocation matrix and the total optimized cost.
Examples
1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 | ## Not run:
#Input matrix where last row is the Demand and last column is the Supply
ex_matrix=data.frame(M1=c(13,10,25,17,210),M2=c(25,19,10,24,240),
M3=c(8,18,15,18,110),M4=c(13,5,14,13,80),M5=c(20,12,18,19,170),
Supply=c(430,150,100,130,810),
row.names = c("W1","W2","W3","W4","Demand"))
ex_matrix
M1 M2 M3 M4 M5 Supply
W1 13 25 8 13 20 430
W2 10 19 18 5 12 150
W3 25 10 15 14 18 100
W4 17 24 18 13 19 130
Demand 210 240 110 80 170 810
mincost(ex_matrix)
$Alloc_Matrix
M1 M2 M3 M4 M5
W1 140 140 110 0 40
W2 70 0 0 80 0
W3 0 100 0 0 0
W4 0 0 0 0 130
$Total_Cost
[1] 11570
## End(Not run)
|
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Note that we can't provide technical support on individual packages. You should contact the package authors for that.
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