Heat Flow in Polygons with Reflecting Edges

Pub Date : 2023-11-07 DOI:10.1007/s00020-023-02749-0

Sam Farrington, Katie Gittins

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Abstract

Abstract We investigate the heat flow in an open, bounded set D in $$\mathbb {R}^2$$ R 2 with polygonal boundary $$\partial D$$ ∂ D . We suppose that D contains an open, bounded set $$\widetilde{D}$$ D ~ with polygonal boundary $$\partial \widetilde{D}$$ ∂ D ~ . The initial condition is the indicator function of $$\widetilde{D}$$ D ~ and we impose a Neumann boundary condition on the edges of $$\partial D$$ ∂ D . We obtain an asymptotic formula for the heat content of $$\widetilde{D}$$ D ~ in D as time $$t\downarrow 0$$ t ↓ 0 .

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具有反射边的多边形中的热流

研究了在$$\mathbb {R}^2$$ r2中具有多边形边界$$\partial D$$∂D的开放有界集D中的热流。我们假设D包含一个开放的有界集合$$\widetilde{D}$$ D，其多边形边界$$\partial \widetilde{D}$$∂D。初始条件是$$\widetilde{D}$$ D的指示函数，我们在$$\partial D$$∂D的边缘上施加了诺伊曼边界条件。我们得到了时间$$t\downarrow 0$$ t↓0时$$\widetilde{D}$$ D在D中的热含量的渐近公式。

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