On the fibers and semi-algebraicity of ReLU neuromanifolds
Abstract
We study the semi-algebraicity of the neuromanifold Md of a feedforward ReLU neural network and its symmetries. We prove that Md is not a semi-algebraic quotient of the space of weights of the network. We introduce and study the notion of honest open subset of the space of weights, where the network does not show any hidden symmetries. Finally, we conjecture that the maximal honest open is always semi-algebraic and prove that in the shallow case it is even Zariski.
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