The aim of this paper is to optimize the shape of a highly conductive interface in order to drain the maximum amount of heat. Given the ubiquity of irregular interfaces in heat transmission processes, we model such interfaces by Koch-mixture fractal layers. We propose a dynamics that iteratively refines these mixtures in order to maximize the temperature reduction in the bulk. We obtain that asymmetric Koch-mixtures drain heat effectively when properly refined. In addition, we show that the conductivity of the interface plays a significant role in the refinement of the optimal shape.
Dettaglio pubblicazione
2023, CHAOS, SOLITONS AND FRACTALS, Pages 1-11 (volume: 173)
Fractal mixtures for optimal heat draining (01a Articolo in rivista)
Cefalo M., Creo S., Lancia M. R., Rodriguez-Cuadrado J.
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