Sharp bounds for the number of regions of maxout networks and vertices of Minkowski sums

IF 1.6 2区 数学 Q2 MATHEMATICS, APPLIED SIAM Journal on Applied Algebra and Geometry Pub Date : 2021-04-16 DOI:10.1137/21m1413699
Guido Montúfar, Yue Ren, Leon Zhang
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引用次数: 23

Abstract

We present results on the number of linear regions of the functions that can be represented by artificial feedforward neural networks with maxout units. A rank-k maxout unit is a function computing the maximum of $k$ linear functions. For networks with a single layer of maxout units, the linear regions correspond to the upper vertices of a Minkowski sum of polytopes. We obtain face counting formulas in terms of the intersection posets of tropical hypersurfaces or the number of upper faces of partial Minkowski sums, along with explicit sharp upper bounds for the number of regions for any input dimension, any number of units, and any ranks, in the cases with and without biases. Based on these results we also obtain asymptotically sharp upper bounds for networks with multiple layers.
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maxout网络的区域数目和Minkowski和的顶点数目的尖锐界限
我们给出了可以用带有maxout单元的人工前馈神经网络表示的函数的线性区域的数量的结果。rank-k maxout单元是计算$k$线性函数最大值的函数。对于具有单层maxout单元的网络,线性区域对应于多面体Minkowski和的上顶点。我们根据热带超曲面的交点偏置集或偏Minkowski和的上面数量获得了面计数公式,以及在有或没有偏差的情况下,任何输入维度、任何单位数量和任何秩的区域数量的明确的上界。基于这些结果,我们也得到了多层网络的渐近锐上界。
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来源期刊
CiteScore
2.20
自引率
0.00%
发文量
19
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