Relaxation by nonlinear diffusion enhancement in a two-dimensional cross-diffusion model for urban crime propagation

Generalized solutions for a system of partial differential equations arising from urban crime modeling with a logistic source term

(2020) Frederic Heihoff   ZEITSCHRIFT FUR ANGEWANDTE MATHEMATIK UND PHYSIK

Global solvability and stabilization in a two-dimensional cross-diffusion system modeling urban crime propagation

(2019) Michael Winkler   ANNALES DE L INSTITUT HENRI POINCARE-ANALYSE NON LINEAIRE

Global solutions to a higher-dimensional system related to crime modeling

(2018) Marcel Freitag   MATHEMATICAL METHODS IN THE APPLIED SCIENCES

Exploring data assimilation and forecasting issues for an urban crime model

(2015) DAVID J. B. LLOYD et al.   EUROPEAN JOURNAL OF APPLIED MATHEMATICS

Hotspot formation and dynamics for a continuum model of urban crime

(2015) W. H. TSE et al.   EUROPEAN JOURNAL OF APPLIED MATHEMATICS

Toward a mathematical theory of Keller–Segel models of pattern formation in biological tissues

(2015) N. Bellomo et al.   MATHEMATICAL MODELS & METHODS IN APPLIED SCIENCES

Statistical physics of crime: A review

(2015) Maria R. D'Orsogna et al.   Physics of Life Reviews

The stability of steady-state hot-spot patterns for a reaction-diffusion model of urban crime

(2014) Juncheng Wei et al.   DISCRETE AND CONTINUOUS DYNAMICAL SYSTEMS-SERIES B

Cops on the dots in a mathematical model of urban crime and police response

(2014) Joseph R. Zipkin et al.   DISCRETE AND CONTINUOUS DYNAMICAL SYSTEMS-SERIES B

Existence of Symmetric and Asymmetric Spikes for a Crime Hotspot Model

(2014) Henri Berestycki et al.   SIAM JOURNAL ON MATHEMATICAL ANALYSIS

Finite-time blow-up in the higher-dimensional parabolic–parabolic Keller–Segel system

(2013) Michael Winkler   JOURNAL DE MATHEMATIQUES PURES ET APPLIQUEES

Traveling Wave Solutions in a Reaction-Diffusion Model for Criminal Activity

(2013) H. Berestycki et al.   MULTISCALE MODELING & SIMULATION

On localised hotspots of an urban crime model

(2013) David J.B. Lloyd et al.   PHYSICA D-NONLINEAR PHENOMENA

Crime Modeling with Lévy Flights

(2013) Sorathan Chaturapruek et al.   SIAM JOURNAL ON APPLIED MATHEMATICS

Global existence of solutions for a chemotaxis-type system arising in crime modelling

(2012) RAÚL MANÁSEVICH et al.   EUROPEAN JOURNAL OF APPLIED MATHEMATICS

On the global well-posedness theory for a class of PDE models for criminal activity

(2012) N. Rodríguez   PHYSICA D-NONLINEAR PHENOMENA

Global Bifurcation of Solutions for Crime Modeling Equations

(2012) Robert Stephen Cantrell et al.   SIAM JOURNAL ON MATHEMATICAL ANALYSIS

Boundedness in a quasilinear parabolic–parabolic Keller–Segel system with subcritical sensitivity

(2011) Youshan Tao et al.   JOURNAL OF DIFFERENTIAL EQUATIONS

Adding police to a mathematical model of burglary

(2010) ASHLEY B. PITCHER   EUROPEAN JOURNAL OF APPLIED MATHEMATICS

Aggregation vs. global diffusive behavior in the higher-dimensional Keller–Segel model

(2010) Michael Winkler   JOURNAL OF DIFFERENTIAL EQUATIONS

MATHEMATICS AND COMPLEXITY IN LIFE AND HUMAN SCIENCES

(2010) N. BELLOMO et al.   MATHEMATICAL MODELS & METHODS IN APPLIED SCIENCES

STATISTICAL MODELS OF CRIMINAL BEHAVIOR: THE EFFECTS OF LAW ENFORCEMENT ACTIONS

(2010) PAUL A. JONES et al.   MATHEMATICAL MODELS & METHODS IN APPLIED SCIENCES

Dissipation and displacement of hotspots in reaction-diffusion models of crime

(2010) M. B. Short et al.   PROCEEDINGS OF THE NATIONAL ACADEMY OF SCIENCES OF THE UNITED STATES OF AMERICA

A STATISTICAL MODEL OF CRIMINAL BEHAVIOR

(2008) M. B. SHORT et al.   MATHEMATICAL MODELS & METHODS IN APPLIED SCIENCES