[link]
Summary by Martin Thoma 5 years ago
This paper is about a recommendation system approach using collaborative filtering (CF) on implicit feedback datasets.
The core of it is the minimization problem
$$\min_{x_*, y_*} \sum_{u,i} c_{ui} (p_{ui} - x_u^T y_i)^2 + \underbrace{\lambda \left ( \sum_u || x_u ||^2 + \sum_i || y_i ||^2\right )}_{\text{Regularization}}$$
with
* $\lambda \in [0, \infty[$ is a hyper parameter which defines how strong the model is regularized
* $u$ denoting a user, $u_*$ are all user factors $x_u$ combined
* $i$ denoting an item, $y_*$ are all item factors $y_i$ combined
* $x_u \in \mathbb{R}^n$ is the latent user factor (embedding); $n$ is another hyper parameter. $n=50$ seems to be a reasonable choice.
* $y_i \in \mathbb{R}^n$ is the latent item factor (embedding)
* $r_{ui}$ defines the "intensity"; higher values mean user $u$ interacted more with item $i$
* $p_{ui} = \begin{cases}1 & \text{if } r_{ui} >0\\0 &\text{otherwise}\end{cases}$
* $c_{ui} := 1 + \alpha r_{ui}$ where $\alpha \in [0, \infty[$ is a hyper parameter; $\alpha =40$ seems to be reasonable
In contrast, the standard matrix factoriation optimization function looks like this ([example](https://www.cs.cmu.edu/~mgormley/courses/10601-s17/slides/lecture25-mf.pdf)):
$$\min_{x_*, y_*} \sum_{(u, i, r_{ui}) \in \mathcal{R}} {(r_{ui} - x_u^T y_i)}^2 + \underbrace{\lambda \left ( \sum_u || x_u ||^2 + \sum_i || y_i ||^2\right )}_{\text{Regularization}}$$
where
* $\mathcal{R}$ is the set of all ratings $(u, i, r_{ui})$ - user $u$ has rated item $i$ with value $r_{ui} \in \mathbb{R}$
They use alternating least squares (ALS) to train this model.
The prediction then is the dot product between the user factor and all item factors ([source](https://github.com/benfred/implicit/blob/master/implicit/recommender_base.pyx#L157-L176))
more
less