Saved in:
Bibliographic Details
Main Authors: Tumma, Neehal, Loo, Noel, Rus, Daniela
Format: Preprint
Published: 2026
Subjects:
Online Access:https://arxiv.org/abs/2604.21100
Tags: Add Tag
No Tags, Be the first to tag this record!
_version_ 1866908987996241920
author Tumma, Neehal
Loo, Noel
Rus, Daniela
author_facet Tumma, Neehal
Loo, Noel
Rus, Daniela
contents To address the increasing long-context compute limitations of softmax attention, several subquadratic recurrent operators have been developed. This work includes models such as Mamba-2, DeltaNet, Gated DeltaNet (GDN), and Kimi Delta Attention (KDA). As the space of recurrences grows, a parallel line of work has arisen to taxonomize them. One compelling view is the test-time regression (TTR) framework, which interprets recurrences as performing online least squares updates that learn a linear map from the keys to values. Existing delta-rule recurrences can be seen as first-order approximations to this objective, but notably ignore the curvature of the least-squares loss during optimization. In this work, we address this by introducing preconditioning to these recurrences. Starting from the theory of online least squares, we derive equivalences between linear attention and the delta rule in the exactly preconditioned case. Next, we realize this theory in practice by proposing a diagonal approximation: this enables us to introduce preconditioned variants of DeltaNet, GDN, and KDA alongside efficient chunkwise parallel algorithms for computing them. Empirically, we find that our preconditioned delta-rule recurrences yield consistent performance improvements across synthetic recall benchmarks and language modeling at the 340M and 1B scale.
format Preprint
id arxiv_https___arxiv_org_abs_2604_21100
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Preconditioned DeltaNet: Curvature-aware Sequence Modeling for Linear Recurrences
Tumma, Neehal
Loo, Noel
Rus, Daniela
Machine Learning
To address the increasing long-context compute limitations of softmax attention, several subquadratic recurrent operators have been developed. This work includes models such as Mamba-2, DeltaNet, Gated DeltaNet (GDN), and Kimi Delta Attention (KDA). As the space of recurrences grows, a parallel line of work has arisen to taxonomize them. One compelling view is the test-time regression (TTR) framework, which interprets recurrences as performing online least squares updates that learn a linear map from the keys to values. Existing delta-rule recurrences can be seen as first-order approximations to this objective, but notably ignore the curvature of the least-squares loss during optimization. In this work, we address this by introducing preconditioning to these recurrences. Starting from the theory of online least squares, we derive equivalences between linear attention and the delta rule in the exactly preconditioned case. Next, we realize this theory in practice by proposing a diagonal approximation: this enables us to introduce preconditioned variants of DeltaNet, GDN, and KDA alongside efficient chunkwise parallel algorithms for computing them. Empirically, we find that our preconditioned delta-rule recurrences yield consistent performance improvements across synthetic recall benchmarks and language modeling at the 340M and 1B scale.
title Preconditioned DeltaNet: Curvature-aware Sequence Modeling for Linear Recurrences
topic Machine Learning
url https://arxiv.org/abs/2604.21100