Metadata-Version: 2.4
Name: parax
Version: 0.3.8
Summary: Declarative, parametric modelling in JAX
Author-email: Gary Allen <gvcallen@gmail.com>
Project-URL: homepage, https://github.com/gvcallen/parax
Description-Content-Type: text/markdown
License-File: LICENSE
Requires-Dist: equinox
Requires-Dist: jax
Requires-Dist: jaxtyping
Requires-Dist: distreqx
Requires-Dist: jsonpickle
Provides-Extra: docs
Requires-Dist: mkdocs; extra == "docs"
Requires-Dist: mkdocs-material; extra == "docs"
Requires-Dist: mkdocstrings[python]; extra == "docs"
Provides-Extra: test
Requires-Dist: pytest; extra == "test"
Requires-Dist: optimistix; extra == "test"
Dynamic: license-file

![Parax Logo](assets/logo.png)

# Parax: Parametric modeling in JAX

**Parax** is a declarative, parametric modelling library built on top of [JAX](https://github.com/jax-ml/jax) and [Equinox](https://github.com/patrick-kidger/equinox).

At its core, the library provides a `Parameter` class which can be set as fixed for training, as well as assigned arbitrary metadata.

| **Parax** |  |
|-------------|-------|
| **Author**  | Gary Allen |
| **Homepage** | [github.com/parax/parax](https://github.com/parax/parax) |
| **Docs** | [gvcallen.github.io/parax](https://gvcallen.github.io/parax) |

## Features

- **Easy parameter fixing**: Parameters can be marked as *fixed* and the resultant modules partitioned using *parax.partition*.
- **Encapsulated constraints and scaling**: Scaling and bijector transformations are abstracted away by applying them when the parameter object is cast to a JAX array. This can be used, for example, to enforce positivity or arbitrary constraints during optimization.
- **Parameter transforms**: Arbitrary transforms can be applied to parameters using `myparam.transformed(bij)`. This applies a bijector to both the parameter and its underlying distribution.
- **Arbitrary metadata support**: While Parax natively caters for distributions, bijectors, scaling, bounds and a name, arbitrary metadata can also be attached for more complex modelling (for example, in the scientific domain it is common to want to attach units to a parameter).
- **Extended Equinox module**: Parax provides `parax.Module`, which extends `eqx.Module` to allow for easy updating, fixing, freeing, or mapping of parameters deep within complex models using simple string paths and bulk `with_*` methods.
- (experimental) **Model saving and loading**. By employing methods to serialize `distreqx` distributions and bijections, Parax provides (experimental) support to directly save (pickle) models using `parax.load` and `parax.save`, as long as they align to certain rules.

## Installation
Parax can be installed using pip directly:

``
pip install parax
``

## Overview

The `Parameter` class is designed to be used as if it was a JAX array. The raw `value` inside a parameter is therefore stored in "latent" space i.e. *untransformed* and *unscaled*. However, parameters eagerly cast to JAX arrays, at which point the bijection and scaling is applied. This completely abstracts the underlying latent value (to be used in optimization) from the user, bypassing the need to explicitly apply the transform.

To make optimization easy, `Parax` also comes with a built-in `parax.partition` function, which partitions a model into trainable parameters. If a model is built purely using `Parameter`'s, this removes the need for any conditional logical that would usually be done manually during `eqx.partition`.

Further, `Parax` also provides an extended version of Equinox's `Module` in `parax.Module`. This allows for parameter-aware module inspection and manipulation. For example, parameters can easily be flattened, updated using a single string assigned using the hierarchy, and mapped in batches.

The library is mainly intended for use in domain-specific scientific modeling, but can easily be applied to broader applications.

## Example 1: Enforcing positivity

The following example creates a `parax.Parameter` that is strictly positive and whose physical value follows a normal distribution.

```python
import parax as prx
from parax.bijectors import Exponential

normal_param = prx.Normal(1.0, 0.1, bijector=Exponential())
print(normal_param.latent_value) # prints 0.0
print(normal_param.value) # prints 1.0
```

## Example 2: Optimizing a model

In this example, we define a simple quadratic model ($y = ax^2 + bx + c$). We fix the y-intercept, leave the other coefficients free, and use JAX and ``optimistix`` to fit the model to some noisy data.

```python

import jax
import jax.numpy as jnp
import equinox as eqx
import optimistix as optx

import parax as prx
from parax.parameters import Free, Fixed

# 1. Define the Parametric Model
class Quadratic(eqx.Module):
    """A generic quadratic curve: y = a*x^2 + b*x + c"""
    
    a: prx.Parameter
    b: prx.Parameter
    c: prx.Parameter

    def __call__(self, x: jnp.ndarray) -> jnp.ndarray:
        return self.a * (x ** 2) + self.b * x + self.c
    
# We pass in free/fixed parameters without metadata using factories.
# Note that `parax.Module` would allow us to simply pass `a=1.5` for free parameters.
model = Quadratic(a=Free(1.5), b=Free(0.5), c=Fixed(10.0))

# 2. Generate some dummy "ground truth" data with noise
x_true = jnp.linspace(-5.0, 5.0, 100)
y_true = 3.0 * (x_true ** 2) - 2.0 * x_true + 10.0 # True a=3.0, b=-2.0
y_true = y_true + jax.random.normal(jax.random.key(0), x_true.shape)

# 3. Partition the model into free and fixed parameters
params, static = prx.partition(model)

# 4. Define the loss Function
def loss_fn(params, args=None):
    model = eqx.combine(params, static)
    y_pred = model(x_true)
    return jnp.mean((y_pred - y_true)**2)

# 5. Run the BFGS optimizer
solver = optx.LBFGS(rtol=1e-6, atol=1e-6)
solution = optx.minimise(
    fn=loss_fn,
    y0=params,
    solver=solver,
    args=(x_true, y_true, static),
)

# 6. Recombine to get the final fitted model
fitted_model = eqx.combine(solution.value, static)

print(f"Fitted 'a': {jnp.array(fitted_model.a):.8f} (Expected ~3.0)")
print(f"Fitted 'b': {jnp.array(fitted_model.b):.8f} (Expected ~-2.0)")
print(f"Fixed 'c':  {jnp.array(fitted_model.c):.8f} (Remained 10.0)")
print(f'Final loss: {loss_fn(fitted_model)}')
print(solution.result)
```
