Paper List
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Translating Measures onto Mechanisms: The Cognitive Relevance of Higher-Order Information
This review addresses the core challenge of translating abstract higher-order information theory metrics (e.g., synergy, redundancy) into defensible, ...
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Emergent Bayesian Behaviour and Optimal Cue Combination in LLMs
This paper addresses the critical gap in understanding whether LLMs spontaneously develop human-like Bayesian strategies for processing uncertain info...
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Vessel Network Topology in Molecular Communication: Insights from Experiments and Theory
This work addresses the critical lack of experimentally validated channel models for molecular communication within complex vessel networks, which is ...
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Modulation of DNA rheology by a transcription factor that forms aging microgels
This work addresses the fundamental question of how the transcription factor NANOG, essential for embryonic stem cell pluripotency, physically regulat...
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Imperfect molecular detection renormalizes apparent kinetic rates in stochastic gene regulatory networks
This paper addresses the core challenge of distinguishing genuine stochastic dynamics of gene regulatory networks from artifacts introduced by imperfe...
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PanFoMa: A Lightweight Foundation Model and Benchmark for Pan-Cancer
This paper addresses the dual challenge of achieving computational efficiency without sacrificing accuracy in whole-transcriptome single-cell represen...
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Beyond Bayesian Inference: The Correlation Integral Likelihood Framework and Gradient Flow Methods for Deterministic Sampling
This paper addresses the core challenge of calibrating complex biological models (e.g., PDEs, agent-based models) with incomplete, noisy, or heterogen...
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Contrastive Deep Learning for Variant Detection in Wastewater Genomic Sequencing
This paper addresses the core challenge of detecting viral variants in wastewater sequencing data without reference genomes or labeled annotations, ov...
Linear Readout of Neural Manifolds with Continuous Variables
Department of Physics and Kempner Institute, Harvard University | Center for Computational Neuroscience, Flatiron Institute
30秒速读
IN SHORT: This paper addresses the core challenge of quantifying how the geometric structure of high-dimensional neural population activity (neural manifolds) determines the efficiency of linearly decoding continuous variables, amidst complex neural variability.
核心创新
- Theory Develops the first statistical-mechanical theory of 'regression capacity,' extending manifold capacity theory from discrete classification to continuous regression problems.
- Methodology Derives closed-form analytical formulas for regression capacity in synthetic models (e.g., spherical manifolds) and provides an instance-based estimator applicable to finite, real-world datasets.
- Biology Applies the framework to primate visual cortex data, quantitatively demonstrating a monotonic increase in linear decodability for object pose parameters (size, position) along the ventral stream (pixels → V4 → IT).
主要结论
- For synthetic spherical manifold models, regression capacity α decreases with increasing manifold dimensionality D and equivalent radius R_equiv (e.g., capacity drops as D increases for fixed R_equiv).
- In the mean-field model for point-like manifolds, capacity depends solely on the asymptotically equivalent tolerance ε_equiv = ε/(σ√(1-ρ)), where σ scales labels and ρ controls label correlations.
- Application to macaque ventral stream data shows regression capacity for object size and position increases (critical dimension N_crit decreases) from early (pixels) to late (IT) processing stages, indicating more efficient geometric organization for linear readout.
摘要: Brains and artificial neural networks compute with continuous variables such as object position or stimulus orientation. However, the complex variability in neural responses makes it difficult to link internal representational structure to task performance. We develop a statistical-mechanical theory of regression capacity that relates linear decoding efficiency of continuous variables to geometric properties of neural manifolds. Our theory handles complex neural variability and applies to real data, revealing increasing capacity for decoding object position and size along the monkey visual stream.