Related papers: Conjugate Learning Theory: Uncovering the Mechanisms of Trainability and Generalization in Deep Neural Networks

Conjugate Learning Theory: Uncovering the Mechanisms of Trainability and Generalization in Deep Neural Networks

URL: http://arxiv.org/abs/2602.16177v2
Date: Thu, 19 Feb 2026 02:36:01 GMT
Title: Conjugate Learning Theory: Uncovering the Mechanisms of Trainability and Generalization in Deep Neural Networks
Authors: Binchuan Qi,
Abstract summary: We develop a conjugate learning theoretical framework based on convex conjugate duality to characterize this learnability property.<n>We demonstrate that training deep neural networks (DNNs) with mini-batch descent (SGD) achieves global optima of empirical risk.<n>We derive deterministic and probabilistic bounds on generalization error based on conditional generalized entropy measures.
Score: 0.0
License: http://creativecommons.org/licenses/by/4.0/
Abstract: In this work, we propose a notion of practical learnability grounded in finite sample settings, and develop a conjugate learning theoretical framework based on convex conjugate duality to characterize this learnability property. Building on this foundation, we demonstrate that training deep neural networks (DNNs) with mini-batch stochastic gradient descent (SGD) achieves global optima of empirical risk by jointly controlling the extreme eigenvalues of a structure matrix and the gradient energy, and we establish a corresponding convergence theorem. We further elucidate the impact of batch size and model architecture (including depth, parameter count, sparsity, skip connections, and other characteristics) on non-convex optimization. Additionally, we derive a model-agnostic lower bound for the achievable empirical risk, theoretically demonstrating that data determines the fundamental limit of trainability. On the generalization front, we derive deterministic and probabilistic bounds on generalization error based on generalized conditional entropy measures. The former explicitly delineates the range of generalization error, while the latter characterizes the distribution of generalization error relative to the deterministic bounds under independent and identically distributed (i.i.d.) sampling conditions. Furthermore, these bounds explicitly quantify the influence of three key factors: (i) information loss induced by irreversibility in the model, (ii) the maximum attainable loss value, and (iii) the generalized conditional entropy of features with respect to labels. Moreover, they offer a unified theoretical lens for understanding the roles of regularization, irreversible transformations, and network depth in shaping the generalization behavior of deep neural networks. Extensive experiments validate all theoretical predictions, confirming the framework's correctness and consistency.

Related papers

Nonparametric Identification and Inference for Counterfactual Distributions with Confounding [6.997978440999076]
We propose nonparametric identification and semiparametric estimation of joint potential outcome in the presence of confounding.<n>By bridging classical semiparametric theory with modern representation learning, this work provides a robust statistical foundation for distributional and counterfactual inference in complex causal systems.
arXiv Detail & Related papers (2026-02-17T05:00:13Z)
Understanding Generalization from Embedding Dimension and Distributional Convergence [13.491874401333021]
We study generalization from a representation-centric perspective and analyze how the geometry of learned embeddings controls predictive performance for a fixed trained model.<n>We show that population risk can be bounded by two factors: (i) the intrinsic dimension of the embedding distribution, which determines the convergence rate of empirical embedding distribution to the population distribution in Wasserstein distance, and (ii) the sensitivity of the downstream mapping from embeddings to predictions, characterized by Lipschitz constants.
arXiv Detail & Related papers (2026-01-30T09:32:04Z)
Towards A Unified PAC-Bayesian Framework for Norm-based Generalization Bounds [63.47271262149291]
We propose a unified framework for PAC-Bayesian norm-based generalization.<n>The key to our approach is a sensitivity matrix that quantifies the network outputs with respect to structured weight perturbations.<n>We derive a family of generalization bounds that recover several existing PAC-Bayesian results as special cases.
arXiv Detail & Related papers (2026-01-13T00:42:22Z)
Random-Matrix-Induced Simplicity Bias in Over-parameterized Variational Quantum Circuits [72.0643009153473]
We show that expressive variational ansatze enter a Haar-like universality class in which both observable expectation values and parameter gradients concentrate exponentially with system size.<n>As a consequence, the hypothesis class induced by such circuits collapses with high probability to a narrow family of near-constant functions.<n>We further show that this collapse is not unavoidable: tensor-structured VQCs, including tensor-network-based and tensor-hypernetwork parameterizations, lie outside the Haar-like universality class.
arXiv Detail & Related papers (2026-01-05T08:04:33Z)
Non-Asymptotic Stability and Consistency Guarantees for Physics-Informed Neural Networks via Coercive Operator Analysis [0.0]
We present a unified theoretical framework for analyzing the stability and consistency of Physics-Informed Neural Networks (PINNs)<n>PINNs approximate solutions to partial differential equations (PDEs) by minimizing residual losses over sampled collocation and boundary points.<n>We formalize both operator-level and variational notions of consistency, proving that residual minimization in Sobolev norms leads to convergence in energy and uniform norms under mild regularity.
arXiv Detail & Related papers (2025-06-16T14:41:15Z)
Precise gradient descent training dynamics for finite-width multi-layer neural networks [8.057006406834466]
We provide the first precise distributional characterization of gradient descent iterates for general multi-layer neural networks.<n>Our non-asymptotic state evolution theory captures Gaussian fluctuations in first-layer weights and concentration in deeper-layer weights.
arXiv Detail & Related papers (2025-05-08T02:19:39Z)
Error Bounds of Supervised Classification from Information-Theoretic Perspective [0.0]
We explore bounds on the expected risk when using deep neural networks for supervised classification from an information theoretic perspective. We introduce model risk and fitting error, which are derived from further decomposing the empirical risk.
arXiv Detail & Related papers (2024-06-07T01:07:35Z)
A PAC-Bayesian Perspective on the Interpolating Information Criterion [54.548058449535155]
We show how a PAC-Bayes bound is obtained for a general class of models, characterizing factors which influence performance in the interpolating regime. We quantify how the test error for overparameterized models achieving effectively zero training error depends on the quality of the implicit regularization imposed by e.g. the combination of model, parameter-initialization scheme.
arXiv Detail & Related papers (2023-11-13T01:48:08Z)
Advancing Counterfactual Inference through Nonlinear Quantile Regression [77.28323341329461]
We propose a framework for efficient and effective counterfactual inference implemented with neural networks. The proposed approach enhances the capacity to generalize estimated counterfactual outcomes to unseen data. Empirical results conducted on multiple datasets offer compelling support for our theoretical assertions.
arXiv Detail & Related papers (2023-06-09T08:30:51Z)
Fluctuations, Bias, Variance & Ensemble of Learners: Exact Asymptotics for Convex Losses in High-Dimension [25.711297863946193]
We develop a theory for the study of fluctuations in an ensemble of generalised linear models trained on different, but correlated, features. We provide a complete description of the joint distribution of the empirical risk minimiser for generic convex loss and regularisation in the high-dimensional limit.
arXiv Detail & Related papers (2022-01-31T17:44:58Z)
Predicting Unreliable Predictions by Shattering a Neural Network [145.3823991041987]
Piecewise linear neural networks can be split into subfunctions. Subfunctions have their own activation pattern, domain, and empirical error. Empirical error for the full network can be written as an expectation over subfunctions.
arXiv Detail & Related papers (2021-06-15T18:34:41Z)
Understanding Generalization in Deep Learning via Tensor Methods [53.808840694241]
We advance the understanding of the relations between the network's architecture and its generalizability from the compression perspective. We propose a series of intuitive, data-dependent and easily-measurable properties that tightly characterize the compressibility and generalizability of neural networks.
arXiv Detail & Related papers (2020-01-14T22:26:57Z)

This list is automatically generated from the titles and abstracts of the papers in this site.