Student Feature - Wesley R. Perkins

Wesley Perkins is a recent PhD studying existence, stability, and dynamics of nonlinear wave solutions to partial differential equations (PDEs) arising from physical applications.

Exploring Symmetry in Chaos

Michael Field and Martin Golubitsky announce the second edition of their book Symmetry in Chaos: A Search for Pattern in Mathematics, Art, and Nature.

A Moving Argument

Mark Levi talks about stability of a cube resting on a sphere.

A Measure of Morphodynamics

Mattia Serra and L. Mahadevan talk about understanding the way in which a complex, multicellular organism arises from a single cell via spatiotemporal patterns that are repeatable and reproducible across the tree of life.

Long-time Behavior of Nonlinear Schrödinger Equation Waves

Katelyn Plaisier Leisman talks about long-time behavior of Nonlinear Schrödinger equation waves.