Duke Mathematical Journal

Published by Duke University Press since its inception in 1935, the Duke Mathematical Journal is one of the world's leading mathematical journals. DMJ emphasizes the most active and influential areas of current mathematics. Advance publication of articles online is available.

Inequalities for second-order elliptic equations with applications to unbounded domains IVolume 81, Number 2 (1996)
Subconvex equidistribution of cusp forms: Reduction to Eisenstein observablesVolume 168, Number 9 (2019)
Tate cycles on some quaternionic Shimura varieties mod $p$Volume 168, Number 9 (2019)
Interior $C^{2}$ regularity of convex solutions to prescribing scalar curvature equationsVolume 168, Number 9 (2019)
Harmonic Maass forms of weight $1$Volume 164, Number 1 (2015)
• ISSN: 0012-7094 (print), 1547-7398 (electronic)
• Publisher: Duke University Press
• Discipline(s): Mathematics
• Full text available in Euclid: 1935--
• Access: By subscription only
• Euclid URL: https://projecteuclid.org/dmj

Featured bibliometrics

MR Citation Database MCQ (2017): 2.64
JCR (2017) Impact Factor: 2.317
JCR (2017) Five-year Impact Factor: 2.539
JCR (2017) Ranking: 10/309 (Mathematics)
Article Influence (2017): 4.452
Eigenfactor: Duke Mathematical Journal
SJR/SCImago Journal Rank (2017): 6.155

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Featured article

On the polynomial Szemerédi theorem in finite fields

Volume 168, Number 5 (2019)
Abstract

Let $P_{1},\dots,P_{m}\in\mathbb{Z}[y]$ be any linearly independent polynomials with zero constant term. We show that there exists $\gamma\gt 0$ such that any subset of $\mathbb{F}_{q}$ of size at least $q^{1-\gamma}$ contains a nontrivial polynomial progression $x,x+P_{1}(y),\dots,x+P_{m}(y)$, provided that the characteristic of $\mathbb{F}_{q}$ is large enough.