This short report reviews the current state of the research and methodology on theoretical and practical aspects of Artificial Neural Networks (ANN). It was prepared to gather state-of-the-art knowledge needed to construct complex, hypercomplex and fuzzy neural networks. The report reflects the individual interests of the authors and, by now means, cannot be treated as a comprehensive review of the ANN discipline. Considering the fast development of this field, it is currently impossible to do a detailed review of a considerable number of pages. The report is an outcome of the Project 'The Strategic Research Partnership for the mathematical aspects of complex, hypercomplex and fuzzy neural networks' meeting at the University of Warmia and Mazury in Olsztyn, Poland, organized in September 2022.

物理信息的神经网络（PINN）是神经网络（NNS），它们作为神经网络本身的组成部分编码模型方程，例如部分微分方程（PDE）。如今，PINN是用于求解PDE，分数方程，积分分化方程和随机PDE的。这种新颖的方法已成为一个多任务学习框架，在该框架中，NN必须在减少PDE残差的同时拟合观察到的数据。本文对PINNS的文献进行了全面的综述：虽然该研究的主要目标是表征这些网络及其相关的优势和缺点。该综述还试图将出版物纳入更广泛的基于搭配的物理知识的神经网络，这些神经网络构成了香草·皮恩（Vanilla Pinn）以及许多其他变体，例如物理受限的神经网络（PCNN），各种HP-VPINN，变量HP-VPINN，VPINN，VPINN，变体。和保守的Pinn（CPINN）。该研究表明，大多数研究都集中在通过不同的激活功能，梯度优化技术，神经网络结构和损耗功能结构来定制PINN。尽管使用PINN的应用范围广泛，但通过证明其在某些情况下比有限元方法（FEM）等经典数值技术更可行的能力，但仍有可能的进步，最著名的是尚未解决的理论问题。

受生物神经元的启发，激活功能在许多现实世界中常用的任何人工神经网络的学习过程中起着重要作用。文献中已经提出了各种激活功能，用于分类和回归任务。在这项工作中，我们调查了过去已经使用的激活功能以及当前的最新功能。特别是，我们介绍了多年来激活功能的各种发展以及这些激活功能的优势以及缺点或局限性。我们还讨论了经典（固定）激活功能，包括整流器单元和自适应激活功能。除了基于表征的激活函数的分类法外，还提出了基于应用的激活函数的分类法。为此，对MNIST，CIFAR-10和CIFAR-100等分类数据集进行了各种固定和自适应激活函数的系统比较。近年来，已经出现了一个具有物理信息的机器学习框架，以解决与科学计算有关的问题。为此，我们还讨论了在物理知识的机器学习框架中使用的激活功能的各种要求。此外，使用Tensorflow，Pytorch和Jax等各种机器学习库之间进行了不同的固定和自适应激活函数进行各种比较。

神经网络的经典发展主要集中在有限维欧基德空间或有限组之间的学习映射。我们提出了神经网络的概括，以学习映射无限尺寸函数空间之间的运算符。我们通过一类线性积分运算符和非线性激活函数的组成制定运营商的近似，使得组合的操作员可以近似复杂的非线性运算符。我们证明了我们建筑的普遍近似定理。此外，我们介绍了四类运算符参数化：基于图形的运算符，低秩运算符，基于多极图形的运算符和傅里叶运算符，并描述了每个用于用每个计算的高效算法。所提出的神经运营商是决议不变的：它们在底层函数空间的不同离散化之间共享相同的网络参数，并且可以用于零击超分辨率。在数值上，与现有的基于机器学习的方法，达西流程和Navier-Stokes方程相比，所提出的模型显示出卓越的性能，而与传统的PDE求解器相比，与现有的基于机器学习的方法有关的基于机器学习的方法。

These notes were compiled as lecture notes for a course developed and taught at the University of the Southern California. They should be accessible to a typical engineering graduate student with a strong background in Applied Mathematics. The main objective of these notes is to introduce a student who is familiar with concepts in linear algebra and partial differential equations to select topics in deep learning. These lecture notes exploit the strong connections between deep learning algorithms and the more conventional techniques of computational physics to achieve two goals. First, they use concepts from computational physics to develop an understanding of deep learning algorithms. Not surprisingly, many concepts in deep learning can be connected to similar concepts in computational physics, and one can utilize this connection to better understand these algorithms. Second, several novel deep learning algorithms can be used to solve challenging problems in computational physics. Thus, they offer someone who is interested in modeling a physical phenomena with a complementary set of tools.

每个已知的人工深神经网络（DNN）都对应于规范Grothendieck的拓扑中的一个物体。它的学习动态对应于此拓扑中的形态流动。层中的不变结构（例如CNNS或LSTMS）对应于Giraud的堆栈。这种不变性应该是对概括属性的原因，即从约束下的学习数据中推断出来。纤维代表语义前类别（Culioli，Thom），在该类别上定义了人工语言，内部逻辑，直觉主义者，古典或线性（Girard）。网络的语义功能是其能够用这种语言表达理论的能力，以回答输出数据中有关输出的问题。语义信息的数量和空间是通过类比与2015年香农和D.Bennequin的Shannon熵的同源解释来定义的。他们概括了Carnap和Bar-Hillel（1952）发现的措施。令人惊讶的是，上述语义结构通过封闭模型类别的几何纤维对象进行了分类，然后它们产生了DNNS及其语义功能的同位不变。故意类型的理论（Martin-Loef）组织了这些物体和它们之间的纤维。 Grothendieck的导数分析了信息内容和交流。

这是一门专门针对STEM学生开发的介绍性机器学习课程。我们的目标是为有兴趣的读者提供基础知识，以在自己的项目中使用机器学习，并将自己熟悉术语作为进一步阅读相关文献的基础。在这些讲义中，我们讨论受监督，无监督和强化学习。注释从没有神经网络的机器学习方法的说明开始，例如原理分析，T-SNE，聚类以及线性回归和线性分类器。我们继续介绍基本和先进的神经网络结构，例如密集的进料和常规神经网络，经常性的神经网络，受限的玻尔兹曼机器，（变性）自动编码器，生成的对抗性网络。讨论了潜在空间表示的解释性问题，并使用梦和对抗性攻击的例子。最后一部分致力于加强学习，我们在其中介绍了价值功能和政策学习的基本概念。

Despite great progress in simulating multiphysics problems using the numerical discretization of partial differential equations (PDEs), one still cannot seamlessly incorporate noisy data into existing algorithms, mesh generation remains complex, and high-dimensional problems governed by parameterized PDEs cannot be tackled. Moreover, solving inverse problems with hidden physics is often prohibitively expensive and requires different formulations and elaborate computer codes. Machine learning has emerged as a promising alternative, but training deep neural networks requires big data, not always available for scientific problems. Instead, such networks can be trained from additional information obtained by enforcing the physical laws (for example, at random points in the continuous space-time domain). Such physics-informed learning integrates (noisy) data and mathematical models, and implements them through neural networks or other kernel-based regression networks. Moreover, it may be possible to design specialized network architectures that automatically satisfy some of the physical invariants for better accuracy, faster training and improved generalization. Here, we review some of the prevailing trends in embedding physics into machine learning, present some of the current capabilities and limitations and discuss diverse applications of physics-informed learning both for forward and inverse problems, including discovering hidden physics and tackling high-dimensional problems.

这项调查的目的是介绍对深神经网络的近似特性的解释性回顾。具体而言，我们旨在了解深神经网络如何以及为什么要优于其他经典线性和非线性近似方法。这项调查包括三章。在第1章中，我们回顾了深层网络及其组成非线性结构的关键思想和概念。我们通过在解决回归和分类问题时将其作为优化问题来形式化神经网络问题。我们简要讨论用于解决优化问题的随机梯度下降算法以及用于解决优化问题的后传播公式，并解决了与神经网络性能相关的一些问题，包括选择激活功能，成本功能，过度适应问题和正则化。在第2章中，我们将重点转移到神经网络的近似理论上。我们首先介绍多项式近似中的密度概念，尤其是研究实现连续函数的Stone-WeierStrass定理。然后，在线性近似的框架内，我们回顾了馈电网络的密度和收敛速率的一些经典结果，然后在近似Sobolev函数中进行有关深网络复杂性的最新发展。在第3章中，利用非线性近似理论，我们进一步详细介绍了深度和近似网络与其他经典非线性近似方法相比的近似优势。

预测性编码提供了对皮质功能的潜在统一说明 - 假设大脑的核心功能是最小化有关世界生成模型的预测错误。该理论与贝叶斯大脑框架密切相关，在过去的二十年中，在理论和认知神经科学领域都产生了重大影响。基于经验测试的预测编码的改进和扩展的理论和数学模型，以及评估其在大脑中实施的潜在生物学合理性以及该理论所做的具体神经生理学和心理学预测。尽管存在这种持久的知名度，但仍未对预测编码理论，尤其是该领域的最新发展进行全面回顾。在这里，我们提供了核心数学结构和预测编码的逻辑的全面综述，从而补充了文献中最新的教程。我们还回顾了该框架中的各种经典和最新工作，从可以实施预测性编码的神经生物学现实的微电路到预测性编码和广泛使用的错误算法的重新传播之间的紧密关系，以及对近距离的调查。预测性编码和现代机器学习技术之间的关系。

In my previous article I mentioned for the first time that a classical neural network may have quantum properties as its own structure may be entangled. The question one may ask now is whether such a quantum property can be used to entangle other systems? The answer should be yes, as shown in what follows.

近年来，机器学习的巨大进步已经开始对许多科学和技术的许多领域产生重大影响。在本文的文章中，我们探讨了量子技术如何从这项革命中受益。我们在说明性示例中展示了过去几年的科学家如何开始使用机器学习和更广泛的人工智能方法来分析量子测量，估计量子设备的参数，发现新的量子实验设置，协议和反馈策略，以及反馈策略，以及通常改善量子计算，量子通信和量子模拟的各个方面。我们重点介绍了公开挑战和未来的可能性，并在未来十年的一些投机愿景下得出结论。

Deep neural networks provide unprecedented performance gains in many real world problems in signal and image processing. Despite these gains, future development and practical deployment of deep networks is hindered by their blackbox nature, i.e., lack of interpretability, and by the need for very large training sets. An emerging technique called algorithm unrolling or unfolding offers promise in eliminating these issues by providing a concrete and systematic connection between iterative algorithms that are used widely in signal processing and deep neural networks. Unrolling methods were first proposed to develop fast neural network approximations for sparse coding. More recently, this direction has attracted enormous attention and is rapidly growing both in theoretic investigations and practical applications. The growing popularity of unrolled deep networks is due in part to their potential in developing efficient, high-performance and yet interpretable network architectures from reasonable size training sets. In this article, we review algorithm unrolling for signal and image processing. We extensively cover popular techniques for algorithm unrolling in various domains of signal and image processing including imaging, vision and recognition, and speech processing. By reviewing previous works, we reveal the connections between iterative algorithms and neural networks and present recent theoretical results. Finally, we provide a discussion on current limitations of unrolling and suggest possible future research directions.

In recent years, deep learning has infiltrated every field it has touched, reducing the need for specialist knowledge and automating the process of knowledge discovery from data. This review argues that astronomy is no different, and that we are currently in the midst of a deep learning revolution that is transforming the way we do astronomy. We trace the history of astronomical connectionism from the early days of multilayer perceptrons, through the second wave of convolutional and recurrent neural networks, to the current third wave of self-supervised and unsupervised deep learning. We then predict that we will soon enter a fourth wave of astronomical connectionism, in which finetuned versions of an all-encompassing 'foundation' model will replace expertly crafted deep learning models. We argue that such a model can only be brought about through a symbiotic relationship between astronomy and connectionism, whereby astronomy provides high quality multimodal data to train the foundation model, and in turn the foundation model is used to advance astronomical research.

深度学习属于人工智能领域，机器执行通常需要某种人类智能的任务。类似于大脑的基本结构，深度学习算法包括一种人工神经网络，其类似于生物脑结构。利用他们的感官模仿人类的学习过程，深入学习网络被送入（感官）数据，如文本，图像，视频或声音。这些网络在不同的任务中优于最先进的方法，因此，整个领域在过去几年中看到了指数增长。这种增长在过去几年中每年超过10,000多种出版物。例如，只有在医疗领域中的所有出版物中覆盖的搜索引擎只能在Q3 2020中覆盖所有出版物的子集，用于搜索术语“深度学习”，其中大约90％来自过去三年。因此，对深度学习领域的完全概述已经不可能在不久的将来获得，并且在不久的将来可能会难以获得难以获得子场的概要。但是，有几个关于深度学习的综述文章，这些文章专注于特定的科学领域或应用程序，例如计算机愿景的深度学习进步或在物体检测等特定任务中进行。随着这些调查作为基础，这一贡献的目的是提供对不同科学学科的深度学习的第一个高级，分类的元调查。根据底层数据来源（图像，语言，医疗，混合）选择了类别（计算机愿景，语言处理，医疗信息和其他工程）。此外，我们还审查了每个子类别的常见架构，方法，专业，利弊，评估，挑战和未来方向。

Several problems in stochastic analysis are defined through their geometry, and preserving that geometric structure is essential to generating meaningful predictions. Nevertheless, how to design principled deep learning (DL) models capable of encoding these geometric structures remains largely unknown. We address this open problem by introducing a universal causal geometric DL framework in which the user specifies a suitable pair of geometries $\mathscr{X}$ and $\mathscr{Y}$ and our framework returns a DL model capable of causally approximating any ``regular'' map sending time series in $\mathscr{X}^{\mathbb{Z}}$ to time series in $\mathscr{Y}^{\mathbb{Z}}$ while respecting their forward flow of information throughout time. Suitable geometries on $\mathscr{Y}$ include various (adapted) Wasserstein spaces arising in optimal stopping problems, a variety of statistical manifolds describing the conditional distribution of continuous-time finite state Markov chains, and all Fr\'echet spaces admitting a Schauder basis, e.g. as in classical finance. Suitable, $\mathscr{X}$ are any compact subset of any Euclidean space. Our results all quantitatively express the number of parameters needed for our DL model to achieve a given approximation error as a function of the target map's regularity and the geometric structure both of $\mathscr{X}$ and of $\mathscr{Y}$. Even when omitting any temporal structure, our universal approximation theorems are the first guarantees that H\"older functions, defined between such $\mathscr{X}$ and $\mathscr{Y}$ can be approximated by DL models.

在过去的几年中，计算机视觉的显着进步总的来说是归因于深度学习，这是由于大量标记数据的可用性所推动的，并与GPU范式的爆炸性增长配对。在订阅这一观点的同时，本书批评了该领域中所谓的科学进步，并在基于信息的自然法则的框架内提出了对愿景的调查。具体而言，目前的作品提出了有关视觉的基本问题，这些问题尚未被理解，引导读者走上了一个由新颖挑战引起的与机器学习基础共鸣的旅程。中心论点是，要深入了解视觉计算过程，有必要超越通用机器学习算法的应用，而要专注于考虑到视觉信号的时空性质的适当学习理论。

在时间序列预测的各种软计算方法中，模糊认知地图（FCM）已经显示出显着的结果作为模拟和分析复杂系统动态的工具。 FCM具有与经常性神经网络的相似之处，可以被分类为神经模糊方法。换句话说，FCMS是模糊逻辑，神经网络和专家系统方面的混合，它作为模拟和研究复杂系统的动态行为的强大工具。最有趣的特征是知识解释性，动态特征和学习能力。本调查纸的目标主要是在文献中提出的最相关和最近的基于FCCM的时间序列预测模型概述。此外，本文认为介绍FCM模型和学习方法的基础。此外，该调查提供了一些旨在提高FCM的能力的一些想法，以便在处理非稳定性数据和可扩展性问题等现实实验中涵盖一些挑战。此外，具有快速学习算法的FCMS是该领域的主要问题之一。

十年自2010年以来，人工智能成功一直处于计算机科学和技术的最前沿，传染媒介空间模型已经巩固了人工智能最前沿的位置。与此同时，量子计算机已经变得更加强大，主要进步的公告经常在新闻中。这些区域的基础的数学技术比有时意识到更多的共同之处。传染媒介空间在20世纪30年代的量子力学的公理心脏上采取了位置，这一采用是从矢量空间的线性几何形状推导逻辑和概率的关键动机。粒子之间的量子相互作用是使用张量产品进行建模的，其也用于表达人工神经网络中的物体和操作。本文介绍了这些常见的数学区域中的一些，包括如何在人工智能（AI）中使用的示例，特别是在自动推理和自然语言处理（NLP）中。讨论的技术包括矢量空间，标量产品，子空间和含义，正交投影和否定，双向矩阵，密度矩阵，正算子和张量产品。应用领域包括信息检索，分类和含义，建模字传感和歧义，知识库的推断和语义构成。其中一些方法可能会在量子硬件上实现。该实施中的许多实际步骤都处于早期阶段，其中一些已经实现了。解释一些常见的数学工具可以帮助AI和量子计算中的研究人员进一步利用这些重叠，识别和沿途探索新方向。

Many scientific fields study data with an underlying structure that is a non-Euclidean space. Some examples include social networks in computational social sciences, sensor networks in communications, functional networks in brain imaging, regulatory networks in genetics, and meshed surfaces in computer graphics. In many applications, such geometric data are large and complex (in the case of social networks, on the scale of billions), and are natural targets for machine learning techniques. In particular, we would like to use deep neural networks, which have recently proven to be powerful tools for a broad range of problems from computer vision, natural language processing, and audio analysis. However, these tools have been most successful on data with an underlying Euclidean or grid-like structure, and in cases where the invariances of these structures are built into networks used to model them.Geometric deep learning is an umbrella term for emerging techniques attempting to generalize (structured) deep neural models to non-Euclidean domains such as graphs and manifolds. The purpose of this paper is to overview different examples of geometric deep learning problems and present available solutions, key difficulties, applications, and future research directions in this nascent field.