fastxgemm-n3r21s3t6
decomposition variable_bound set_partitioning set_covering mixed_binary general_linear
| Submitter | Variables | Constraints | Density | Status | Group | Objective | MPS File |
|---|---|---|---|---|---|---|---|
| Laurent Sorber | 18684 | 219368 | 1.75214e-04 | open | fastxgemm | 4110.99800117485* | fastxgemm-n3r21s3t6.mps.gz |
Naive multiplication of two N by N matrices requires N^3 scalar multiplications. For N=2, Strassen showed that it could be done in only R=7 < 8=N^3 multiplications. For N=3, it is known that 19 <= R <= 23, and for N=4 it is known that 34 <= R <= 49. This repository contains code that generates a mixed-integer linear program (MILP) formulation of the fast matrix multiplication problem for finding solutions with R < N^3 and proving that they are optimal. For a more detailed description, see the accompanying manuscript.
Location of instance in collection
Instance Statistics
Detailed explanation of the following tables can be found here.
| Original | Presolved | |
|---|---|---|
| Variables | 18684 | 18684 |
| Constraints | 219368 | 219368 |
| Binaries | 378 | 378 |
| Integers | 0 | 1134 |
| Continuous | 18306 | 17172 |
| Implicit Integers | 0 | 1134 |
| Fixed Variables | 0 | 0 |
| Nonzero Density | 0.000175214 | 0.000175214 |
| Nonzeroes | 718146 | 718146 |
| Original | Presolved | |
|---|---|---|
| Total | 219368 | 219368 |
| Empty | 0 | 0 |
| Free | 0 | 0 |
| Singleton | 0 | 0 |
| Aggregations | 0 | 0 |
| Precedence | 46494 | 0 |
| Variable Bound | 46494 | 92988 |
| Set Partitioning | 0 | 567 |
| Set Packing | 0 | 0 |
| Set Covering | 0 | 90 |
| Cardinality | 0 | 0 |
| Invariant Knapsack | 0 | 0 |
| Equation Knapsack | 0 | 0 |
| Bin Packing | 0 | 0 |
| Knapsack | 0 | 0 |
| Integer Knapsack | 0 | 0 |
| Mixed Binary | 126380 | 2684 |
| General Linear | 0 | 123039 |
| Indicator | 0 | 0 |
Structure
Available nonzero structure and decomposition information. Further information can be found here.
Nonzero entries of original problem
Nonzero entries after trivial presolving
Decomposed structure of original problem (dec-file)
Decomposed structure after trivial presolving (dec-file)
| value | min | median | mean | max | |
|---|---|---|---|---|---|
| Components | 1.342423 | ||||
| Constraint % | 4.67707 | 4.67707 | 4.67707 | 4.67707 | |
| Variable % | 4.33526 | 4.33526 | 4.33526 | 4.33526 | |
| Score | 0.939605 |
Best Known Solution(s)
Find solutions below. Download the archive containing all solutions from the Download page.
## Warning in lapply(df["exactobjval"], as.numeric): NAs introduced by coercion| ID | Objective | Exact | Int. Viol | Cons. Viol | Obj. Viol | Submitter | Date | Description |
|---|---|---|---|---|---|---|---|---|
| 4 | 4110.998 | 0 | 3e-07 | 0 | Edward Rothberg | 2019-12-13 | Obtained with Gurobi 9.0 | |
| 3 | 6084.000 | 6084 | 0 | 0e+00 | 0 | Frederic Didier | 2020-01-22 | Obtained with Google OR-tools using 8 Threads through generating subproblems by fixing part of the current solution and trying to solve them with a sub CP-SAT solver |
| 2 | 9084.000 | 0 | 0e+00 | 0 | Robert Ashford and Alkis Vazacopoulus | 2019-12-18 | Found using ODH|CPlex | |
| 1 | 21084.000 | 21084 | 0 | 0e+00 | 0 | - | 2018-10-13 | Solution found during MIPLIB2017 problem selection. |
Similar instances in collection
The following instances are most similar to fastxgemm-n3r21s3t6 in the collection. This similarity analysis is based on 100 scaled instance features describing properties of the variables, objective function, bounds, constraints, and right hand sides.
Reference
@misc{Sorber2017,
author = {Laurent Sorber and Marc Van Barel},
title = {{A mixed-integer linear program formulation for fast matrix multiplication}},
howpublished = "\url{https://github.com/lsorber/fast-matrix-multiplication/blob/master/latex/fast-matrix-multiplication.pdf}",
day = {30},
month = {April},
year = {2017},
note = "[Online]"
}Last Update 2024 by Julian Manns
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