This list is arranged by subject—ordered according to the 2010 Mathematics Subject Classification number corresponding to the primary subject of the paper.

01: History and sociology of mathematics

Addressing the underrepresentation of women in mathematics conferences

An annotated bibliography of work related to gender in science

Diagnosing and addressing the underrepresentation of women in mathematics

How likely is an all-male speakers list, statistically speaking? A mathematician weighs in, with Lauren Bacon

Identifier et remédier à la sous-représentation des femmes en mathématiques

Mentorship and gender

11A: Elementary number theory

A simple polynomial for a simple transposition

A simple polynomial for a transposition

The smallest solution of φ(30n+1)<φ(30n) is ...

Subproducts of small residue classes, with Amir Parvardi

11B: Sequences and sets

Constructions of generalized Sidon sets, with Kevin O'Bryant

Farmer Ted goes natural

Lower bounds for sumsets of multisets in Z_p², with Alexis Peilloux and Erick B. Wong

Many sets have more sums than differences, with Kevin O'Bryant

Optimal primitive sets with restricted primes, with William D. Banks

Primitive sets with large counting functions, with Carl Pomerance

The supremum of autoconvolutions, with applications to additive number theory, with Kevin O'Bryant

The symmetric subset problem in continuous Ramsey theory, with Kevin O'Bryant

11D: Diophantine equations

abc triples, with Winnie Miao

An algorithm for Egyptian fraction representations with restricted denominators, with Yue Shi

Asymptotics for the number of directions determined by [n] × [n] in F_p², with Ethan Patrick White and Chi Hoi Yip

Dense Egyptian fractions

Denser Egyptian fractions

Erdős–Turán with a moving target, equidistribution of roots of reducible quadratics, and Diophantine quadruples, with Scott Sitar

Multidimensional Padé approximation of binomial functions: equalities, with Michael A. Bennett and Kevin O'Bryant

Solubility of systems of quadratic forms

A three-dimensional set of limit points related to the abc conjecture, with Reginald M. Simpson

11F: Modular forms

Dimensions of the spaces of cusp forms and newforms on Γ₀(N) and Γ₁(N)

11G: Elliptic curves

Appendix to 'The frequency of elliptic curve groups over prime finite fields', with Chantal David and Ethan Smith

Averages of the number of points on elliptic curves, with Paul Pollack and Ethan Smith

11J: Diophantine approximation

The unreasonable effectualness of continued function expansions

11K: Probabilistic number theory

Absolutely abnormal numbers

11L: Exponential sums

Exponential sums with reducible polynomials, with Cécile Dartyge

11M: Zeta and L-functions

Nonzero values of Dirichlet L-functions at linear combinations of other zeros, with Nathan Ng

Nonzero values of Dirichlet L-functions in vertical arithmetic progressions, with Nathan Ng

11N: Multiplicative number theory

Asymmetries in the Shanks–Rényi prime number race

An asymptotic formula for the number of smooth values of a polynomial

The average least character nonresidue and further variations on a theme of Erdős, with Paul Pollack

Biases in the Shanks–Rényi prime number race, with Andrey Feuerverger

Carreras de números primos, with Andrew Granville

Comparative prime number theory: a survey, with Justin Scarfy

Counting multiplicative groups with prescribed subgroups, with Jenna Downey

Counting zeros of Dirichlet L-functions, with Michael A. Bennett, Kevin O'Bryant, and Andrew Rechnitzer

Densities in certain three-way prime number races, with Jiawei Lin

Disproving Hooley's conjecture, with Daniel Fiorilli

The distribution of sums and products of additive functions, with Lee Troupe

The distribution of the number of subgroups of the multiplicative group, with Lee Troupe

An Erdős–Kac theorem for the number of prime factors of multiplicative orders, with Leo Goldmakher

Explicit bounds for primes in arithmetic progressions, with Michael A. Bennett, Kevin O'Bryant, and Andrew Rechnitzer

Factorization tests and algorithms arising from counting modular forms and automorphic representations, with Miao Gu

Fake mu's, with Michael J. Mossinghoff and Timothy S. Trudgian

Inclusive prime number races, with Nathan Ng

Inequities in the Shanks–Rényi prime number race: an asymptotic formula for the densities, with Daniel Fiorilli

The iterated Carmichael λ-function and the number of cycles of the power generator, with Carl Pomerance

The least prime primitive root and the shifted sieve

Polynomials whose coefficients are related to the Goldbach conjecture, with Peter Borwein, Kwok-Kwong Stephen Choi, and Charles L. Samuels

Polynomial values free of large prime factors, with Cécile Dartyge and Gérald Tenenbaum

Prime number races, with Andrew Granville

Primes in prime number races, with Jared Duker Lichtman and Carl Pomerance

Roots of unity and nullity modulo n, with Steven Finch and Pascal Sebah

The smallest invariant factor of the multiplicative group, with Ben Chang

Smooth values of polynomials, with Jonathan W. Bober, Dan Fretwell, and Trevor D. Wooley

Squarefree values of trinomial discriminants, with David W. Boyd and Mark Thom

Structural insights and elegant applications: a book review of The Anatomy of Integers

Uniform bounds for the least almost-prime primitive root

The universal invariant profile of the multiplicative group, with Reginald M. Simpson

15: Linear algebra

Almost all integer matrices have no integer eigenvalues, with Erick B. Wong

The number of 2×2 integer matrices having a prescribed integer eigenvalue, with Erick B. Wong

33: Special functions

A product of Gamma function values at fractions with the same denominator

51-52: Geometry

Compactness theorems for geometric packings

The limiting curve of Jarník's polygons

Primitive points in rational polygons, with Imre Bárány, Eric Naslund, and Sinai Robins

Sets that contain their circle centers

90D: Game theory

Restoring fairness to Dukego

The above papers are the intellectual property of Greg Martin, with copyrights held by the author(s) or the journals in which they appear. All rights reserved.