Abstract

We consider the problem of learning a one-hidden-layer neural network: we assume the input x is from Gaussian distribution and the label $y = a \sigma(Bx) + \xi$, where a is a nonnegative vector and  $B$ is a full-rank weight matrix, and $\xi$ is a noise vector. We first give an analytic formula for the population risk of the standard squared loss and demonstrate that it implicitly attempts to decompose a sequence of low-rank tensors simultaneously.
        
        Inspired by the formula, we design a non-convex objective function $G$ whose landscape is guaranteed to have the following properties:
       
        1. All local minima of $G$ are also global minima.
        2. All global minima of $G$ correspond to the ground truth parameters.
        3. The value and gradient of $G$ can be estimated using samples.
        
        With these properties, stochastic gradient descent on $G$ provably converges to the global minimum and learn the ground-truth parameters. We also prove finite sample complexity results and validate the results by simulations.

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