Boundary control and homogenization: optimal climatization through smart double skin boundaries

TL;DR

This paper studies the homogenization of an optimal boundary control problem involving thin layers of particles near control boundaries, with applications to energy-efficient bioclimatic double skin facades in architecture.

Contribution

It introduces a homogenized model with 'strange terms' for optimal boundary control in complex layered structures, advancing understanding of climate control in architectural design.

Findings

Proves convergence of control and state variables to a limit problem.

Identifies the limit problem with a boundary 'strange term'.

Facilitates better analysis of optimal climate control in layered structures.

Abstract

We consider the homogenization of an optimal control problem in which the control is placed on a part of the boundary and the spatial domain contains a thin layer of "small particles", very close to the controlling boundary, and a Robin boundary condition is assumed on the boundary of those "small particles". This problem can be associated with the climatization modeling of Bioclimatic Double Skin Fa\c{c}ades which was developed in modern architecture as a tool for energy optimization. We assume that the size of the particles and the parameters involved in the Robin boundary condition are critical (and so they justify the occurrence of some "strange terms" in the homogenized problem). The cost functional is given by a weighted balance of the distance (in a H^1-type metric) to a prescribed target internal temperature u_{T} and the proper cost of the control (given by its L^2 norm). We prove the (weak) convergence of states u_{{\epsilon}} and of the controls v_{{\epsilon}} to some functions which are completely identified: u_0 satisfies an artificial boundary condition on the control boundary and v_0 is the optimal control associated to a limit cost functional J_0 in which the "boundary strange term" on the control boundary arises. This information on the limit problem makes much more manageable the study of the optimal climatization of such double skin structures.