M
M. Gregory Forest
Researcher at University of North Carolina at Chapel Hill
Publications - 188
Citations - 4262
M. Gregory Forest is an academic researcher from University of North Carolina at Chapel Hill. The author has contributed to research in topics: Liquid crystal & Shear flow. The author has an hindex of 33, co-authored 177 publications receiving 3715 citations. Previous affiliations of M. Gregory Forest include Ohio State University & Indiana University.
Papers
More filters
Journal ArticleDOI
A Biophysical Basis for Mucus Solids Concentration as a Candidate Biomarker for Airways Disease
David B. Hill,Paula A. Vasquez,John W. R. Mellnik,Scott A. McKinley,Aaron Vose,Frank W. Mu,Ashley G. Henderson,Scott H. Donaldson,Neil E. Alexis,Richard C. Boucher,M. Gregory Forest +10 more
TL;DR: Data provide compelling evidence for mucus solids concentration as a baseline clinical biomarker of mucus barrier and clearance functions, and have significant implications for: (1) penetration of cilia into the mucus layer and effectiveness of mucUS transport; and (2) diffusion vs. immobilization of micro-scale particles relevant to mucus Barrier properties.
Journal ArticleDOI
The Binding Site Barrier Elicited by Tumor-Associated Fibroblasts Interferes Disposition of Nanoparticles in Stroma-Vessel Type Tumors
Lei Miao,Jay M. Newby,C. Michael Lin,Lu Zhang,Feifei Xu,William Y. Kim,M. Gregory Forest,Samuel K. Lai,Matthew I. Milowsky,Sara E. Wobker,Leaf Huang +10 more
TL;DR: It was shown that tumor-associated fibroblast cells (TAFs) are the major component of the BSB, particularly in tumors with a stroma-vessel architecture where the location of TAFs aligns with blood vessels, and provides a rationale for exploiting BSBs to target T AFs.
Journal ArticleDOI
Convolutional neural networks automate detection for tracking of submicron-scale particles in 2D and 3D
TL;DR: The neural network tracker provides unprecedented automation and accuracy, with exceptionally low false positive and false negative rates on both 2D and 3D simulated videos and 2D experimental videos of difficult-to-track species.
Book ChapterDOI
Geometry and Modulation Theory for the Periodic Nonlinear Schrodinger Equation
M. Gregory Forest,Jong-Eao Lee +1 more
TL;DR: In this paper, the integrable structure of solutions of the nonlinear Schrodinger (NLS) equation under periodic and quasiperiodic boundary conditions is described. But the authors focus on those aspects of the exact theory which reveal the behavior of these solutions under perturbations of initial conditions (i.e. linearized instabilities), and the effects of slow modulations in space and time, perhaps in the presence of external perturbation.
Journal ArticleDOI
Spectral theory for the periodic sine‐Gordon equation: A concrete viewpoint
TL;DR: In this article, the spectral theory for quasiperiodic sine and sinh-Gordon equations is given, and the relation between the ingredients in the inverse spectral solution of the periodic sine-Gordon equation and physical characteristics of sine•Gordon waves is emphasized.