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| # Running: | |
| You can run the performance benchmark with `./benchmark.sh`. | |
| Modify the search code in `paralleleureqa.jl` and `eureqa.jl` to your liking | |
| (see below for options). Then, in a new Julia file called | |
| `myfile.jl`, you can write: | |
| ```julia | |
| include("paralleleureqa.jl") | |
| fullRun(10, | |
| npop=100, | |
| annealing=true, | |
| ncyclesperiteration=1000, | |
| fractionReplaced=0.1f0, | |
| verbosity=100) | |
| ``` | |
| The first arg is the number of migration periods to run, | |
| with `ncyclesperiteration` determining how many generations | |
| per migration period. `npop` is the number of population members. | |
| `annealing` determines whether to stay in exploration mode, | |
| or tune it down with each cycle. `fractionReplaced` is | |
| how much of the population is replaced by migrated equations each | |
| step. | |
| Run it with threading turned on using: | |
| `julia --threads auto -O3 myfile.jl` | |
| ## Modification | |
| You can change the binary and unary operators in `eureqa.jl` here: | |
| ```julia | |
| const binops = [plus, mult] | |
| const unaops = [sin, cos, exp]; | |
| ``` | |
| E.g., you can add the function for powers with: | |
| ```julia | |
| pow(x::Float32, y::Float32)::Float32 = sign(x)*abs(x)^y | |
| const binops = [plus, mult, pow] | |
| ``` | |
| You can change the dataset here: | |
| ```julia | |
| const X = convert(Array{Float32, 2}, randn(100, 5)*2) | |
| # Here is the function we want to learn (x2^2 + cos(x3) - 5) | |
| const y = convert(Array{Float32, 1}, ((cx,)->cx^2).(X[:, 2]) + cos.(X[:, 3]) .- 5) | |
| ``` | |
| by either loading in a dataset, or modifying the definition of `y`. | |
| (The `.` are are used for vectorization of a scalar function) | |
| ### Hyperparameters | |
| Annealing allows each evolutionary cycle to turn down the exploration | |
| rate over time: at the end (temperature 0), it will only select solutions | |
| better than existing solutions. | |
| The following parameter, parsimony, is how much to punish complex solutions: | |
| ```julia | |
| const parsimony = 0.01 | |
| ``` | |
| Finally, the following | |
| determins how much to scale temperature by (T between 0 and 1). | |
| ```julia | |
| const alpha = 10.0 | |
| ``` | |
| Larger alpha means more exploration. | |
| One can also adjust the relative probabilities of each operation here: | |
| ```julia | |
| weights = [8, 1, 1, 1, 0.1, 2] | |
| ``` | |
| (for: 1. perturb constant, 2. mutate operator, | |
| 3. append a node, 4. delete a subtree, 5. simplify equation, | |
| 6. do nothing). | |
| # TODO | |
| - [ ] Explicit constant operation on hall-of-fame | |
| - [ ] Hyperparameter tune | |
| - [ ] Create a Python interface | |
| - [ ] Create a benchmark for accuracy | |
| - [ ] Create struct to pass through all hyperparameters, instead of treating as constants | |
| - Make sure doesn't affect performance | |
| - [ ] Use NN to generate weights over all probability distribution, and train on some randomly-generated equations | |
| - [ ] Performance: | |
| - [ ] Use an enum for functions instead of storing them? | |
| - Current most expensive operations: | |
| - [x] deepcopy() before the mutate, to see whether to accept or not. | |
| - Seems like its necessary right now. But still by far the slowest option. | |
| - [ ] Calculating the loss function - there is duplicate calculations happening. | |
| - [ ] Declaration of the weights array every iteration | |
| - [x] Create a benchmark for speed | |
| - [x] Simplify subtrees with only constants beneath them. Or should I? Maybe randomly simplify sometimes? | |
| - [x] Record hall of fame | |
| - [x] Optionally (with hyperparameter) migrate the hall of fame, rather than current bests | |
| - [x] Test performance of reduced precision integers | |
| - No effect | |