Grants per year

## Profile The profile is based on mining the text of the experts' scientific documents to create an index of weighted terms, which defines the key subjects of each individual researcher.

- 1 Similar Profiles

Nonlinear Wave Equation
Mathematics

Wave equations
Engineering & Materials Science

Semilinear Wave Equation
Mathematics

Acoustic intensity
Engineering & Materials Science

Scattering
Mathematics

Lp Estimates
Mathematics

Quantum Fields
Mathematics

Wave Operator
Mathematics

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Network
Recent external collaboration on country level. Dive into details by clicking on the dots.

## Grants 2008 2012

- 2 Finished

## FRG: Collaborative Research: Modeling, Computation, and Analysis of Optical Responses of Nano Structures

Liu, D., Schenker, J. H. & Zhou, Z.

5/31/09 → 5/30/12

Project: Research project

## Publications 1987 2018

## Improvements on lower bounds for the blow-up time under local nonlinear Neumann conditions

Yang, X. & Zhou, Z., Jan 1 2018, (Accepted/In press) In : Journal of Differential Equations.Research output: Contribution to journal › Article

Blow-up Time

Neumann Condition

Lower bound

Convex Domain

Nonlinear Boundary Conditions

## Traveling wave solutions for a one dimensional model of cell-to-cell adhesion and diffusion with monostable reaction term

Bao, L. & Zhou, Z. Jun 1 2017 In : Discrete and Continuous Dynamical Systems - Series S. 10, 3, p. 395-412 18 p.Research output: Contribution to journal › Article

Cell Adhesion

Cell adhesion

One-dimensional Model

Traveling Wave Solutions

Ill-posedness

1
Citations

## Blow-up problems for the heat equation with a local nonlinear Neumann boundary condition

Yang, X. & Zhou, Z., Sep 5 2016, In : Journal of Differential Equations. 261, 5, p. 2738-2783 46 p.Research output: Contribution to journal › Article

Blow-up Time

Nonlinear Boundary Conditions

Neumann Boundary Conditions

Heat Equation

Blow-up

## Revisit to Fritz John's paper on the blow-up of nonlinear wave equations

Yang, X. & Zhou, Z., May 1 2016, In : Applied Mathematics Letters. 55, p. 27-35 9 p.Research output: Contribution to journal › Article

Nonlinear Wave Equation

Wave equations

Blow-up

Wave equation

4
Citations

## Traveling wave in backward and forward parabolic equations from population dynamics

Bao, L. & Zhou, Z. 2014 In : Discrete and Continuous Dynamical Systems - Series B. 19, 6, p. 1507-1522 16 p.Research output: Contribution to journal › Article

Population dynamics

Population Dynamics

Traveling Wave

Parabolic Equation

Wave Speed