Heat-content and diffusive leakage from material sets in the low-diffusivity limit

We generalize leading-order asymptotics of a form of the heat content of a submanifold (van den Berg & Gilkey 2015) to the setting of time-dependent diffusion processes in the limit of vanishing diffusivity. Such diffusion processes arise naturally when advection–diffusion processes are viewed i...

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Bibliographic Details
Published in:Nonlinearity 2021-10, Vol.34 (10), p.7303-7321
Main Authors: Schilling, Nathanael, Karrasch, Daniel, Junge, Oliver
Format: Article
Language:English
Subjects:
advection diffusion equation
finite time coherent sets
heat content
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Summary:We generalize leading-order asymptotics of a form of the heat content of a submanifold (van den Berg & Gilkey 2015) to the setting of time-dependent diffusion processes in the limit of vanishing diffusivity. Such diffusion processes arise naturally when advection–diffusion processes are viewed in Lagrangian coordinates. We prove that as diffusivity ɛ goes to zero, the diffusive transport out of a material set S under the time-dependent, mass-preserving advection–diffusion equation with initial condition given by the characteristic function 1 S , is ε / π d A ¯ ( ∂ S ) + o ( ε ) . The surface measure d A ¯ is that of the so-called geometry of mixing , as introduced in (Karrasch & Keller 2020). We apply our result to the characterisation of coherent structures in time-dependent dynamical systems.
ISSN:0951-7715
1361-6544
DOI:10.1088/1361-6544/ac18b1