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Mathew A. Johnson

Mathew A. Johnson

University of Kansas

H-index: 26

North America-United States

Contact Mathew A. Johnson

About Mathew A. Johnson

Mathew A. Johnson, With an exceptional h-index of 26 and a recent h-index of 19 (since 2020), a distinguished researcher at University of Kansas, specializes in the field of Partial Differential Equations, Mathematical Physics.

His recent articles reflect a diverse array of research interests and contributions to the field:

Orbital stability of periodic traveling waves in the b-Camassa–Holm equation

Orbital Stability of Smooth Solitary Waves for the Novikov Equation

Nonlinear subharmonic dynamics of spectrally stable Lugiato-Lefever periodic waves

Modulational Instability in the Ostrovsky Equation and Related Models

Solitary waves in a Whitham equation with small surface tension

Nonlinear modulational dynamics of spectrally stable Lugiato–Lefever periodic waves

Subharmonic dynamics of wave trains in the Korteweg‐de Vries/Kuramoto‐Sivashinsky equation

Subharmonic dynamics of wave trains in reaction–diffusion systems

Mathew A. Johnson Information

University

Position

Associate Professor of Mathematics

Citations(all)

1532

Citations(since 2020)

805

Cited By

1096

hIndex(all)

26

hIndex(since 2020)

19

i10Index(all)

37

i10Index(since 2020)

32

Email

University Profile Page

Google Scholar

Mathew A. Johnson Skills & Research Interests

Partial Differential Equations

Mathematical Physics

Top articles of Mathew A. Johnson

Title

Journal

Author(s)

Publication Date

Orbital stability of periodic traveling waves in the b-Camassa–Holm equation

Physica D: Nonlinear Phenomena

Brett Ehrman

Mathew A Johnson

2024/2/22

Orbital Stability of Smooth Solitary Waves for the Novikov Equation

Proceedings of the American Mathematical Society

Ji Li

Yue Liu

Qiliang Wu

2023/1

Nonlinear subharmonic dynamics of spectrally stable Lugiato-Lefever periodic waves

arXiv preprint arXiv:2307.01176

Mariana Haragus

Mathew A Johnson

Wesley R Perkins

Björn de Rijk

2023/7/3

Modulational Instability in the Ostrovsky Equation and Related Models

arXiv preprint arXiv:2305.08128

Mathew A Johnson

Ashish Kumar Pandey

2023/5/14

Solitary waves in a Whitham equation with small surface tension

Studies in Applied Mathematics

Mathew A Johnson

Tien Truong

Miles H Wheeler

2022/2

Nonlinear modulational dynamics of spectrally stable Lugiato–Lefever periodic waves

Annales de l'Institut Henri Poincaré C

Mariana Haragus

Mathew A Johnson

Wesley R Perkins

Björn de Rijk

2022/12/8

Subharmonic dynamics of wave trains in the Korteweg‐de Vries/Kuramoto‐Sivashinsky equation

Studies in Applied Mathematics

Mathew A Johnson

Wesley R Perkins

2022/4

Subharmonic dynamics of wave trains in reaction–diffusion systems

Physica D: Nonlinear Phenomena

Mathew A Johnson

Wesley R Perkins

2021/8/1

Stability of traveling wave solutions of nonlinear dispersive equations of NLS type

Archive for Rational Mechanics and Analysis

Katelyn Plaisier Leisman

Jared C Bronski

Mathew A Johnson

Robert Marangell

2021/5

Linear modulational and subharmonic dynamics of spectrally stable Lugiato-Lefever periodic waves

Journal of Differential Equations

Mariana Haragus

Mathew A Johnson

Wesley R Perkins

2021/4/15

On the dynamics of traveling fronts arising in nanoscale pattern formation

Physica D: Nonlinear Phenomena

Mathew A Johnson

Gregory D Lyng

Connor Smith

2020/1/1

Generalized solitary waves in the gravity‐capillary Whitham equation

Studies in Applied Mathematics

Mathew A Johnson

J Douglas Wright

2020/1

Modulational instability of viscous fluid conduit periodic waves

SIAM Journal on Mathematical Analysis

Mathew A Johnson

Wesley R Perkins

2020

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