Deep neural networks are powerful tools to model observations over time with non-linear patterns. Despite the widespread use of neural networks in such settings, most theoretical developments of deep neural networks are under the assumption of independent observations, and theoretical results for temporally dependent observations are scarce. To bridge this gap, we study theoretical properties of deep neural networks on modeling non-linear time series data. Specifically, non-asymptotic bounds for prediction error of (sparse) feed-forward neural network with ReLU activation function is established under mixing-type assumptions. These assumptions are mild such that they include a wide range of time series models including auto-regressive models. Compared to independent observations, established convergence rates have additional logarithmic factors to compensate for additional complexity due to dependence among data points. The theoretical results are supported via various numerical simulation settings as well as an application to a macroeconomic data set.
翻译:深神经网络是用非线性模式来模拟长期观测的有力工具。尽管在这种环境中广泛使用神经网络,但深神经网络的多数理论发展都是由独立观察假设的,而且根据时间进行观测的理论结果很少。为了缩小这一差距,我们研究了在非线性时间序列数据模型上深神经网络的理论特性。具体地说,在混合型假设下,使用ReLU激活功能的(Sparse)进向线性神经网络的预测错误的非同步界限已经建立。这些假设比较温和,包括一系列广泛的时间序列模型,包括自动递减模型。与独立观察相比,既定的趋同率具有额外的对数因素,以弥补数据点依赖性带来的额外复杂性。理论结果通过各种数字模拟设置和对宏观经济数据集的应用得到支持。