2022
DOI: 10.48550/arxiv.2204.14053
|View full text |Cite
Preprint
|
Sign up to set email alerts
|

Derivation and analysis of a phase field crystal model for a mixture of active and passive particles

Abstract: We discuss an active phase field crystal (PFC) model that describes a mixture of active and passive particles. First, a microscopic derivation from dynamical density functional theory (DDFT) is presented that includes a systematic treatment of the relevant orientational degrees of freedom. Of particular interest is the construction of the nonlinear and coupling terms. This allows for interesting insights into the microscopic justification of phenomenological constructions used in PFC models for active particle… Show more

Help me understand this report

Search citation statements

Order By: Relevance

Paper Sections

Select...
1

Citation Types

0
1
0

Year Published

2022
2022
2022
2022

Publication Types

Select...
1

Relationship

1
0

Authors

Journals

citations
Cited by 1 publication
(1 citation statement)
references
References 119 publications
(281 reference statements)
0
1
0
Order By: Relevance
“…Such a coupling also restores generic behavior. The coupled passive and active PFC model ( 11) is a simplified version of a more general model whose structure follows from dynamical density functional theory [92]. Such a model not only includes nonlinear terms in the polarization field (corresponding to c 2 = 0) but also feature nonlinear variational coupling terms between all three fields and variational gradient coupling terms involving the densities.…”
Section: Reaction-diffusion Systemmentioning
confidence: 99%
“…Such a coupling also restores generic behavior. The coupled passive and active PFC model ( 11) is a simplified version of a more general model whose structure follows from dynamical density functional theory [92]. Such a model not only includes nonlinear terms in the polarization field (corresponding to c 2 = 0) but also feature nonlinear variational coupling terms between all three fields and variational gradient coupling terms involving the densities.…”
Section: Reaction-diffusion Systemmentioning
confidence: 99%