**Papers Published**

- Da Silva, A.K. and Bejan, A. and Lorente, S.,
*Maximal heat transfer density in vertical morphing channels with natural convection*, Numerical Heat Transfer; Part A: Applications, vol. 45 no. 2 (2004), pp. 135 - 152 .

(last updated on 2007/04/06)**Abstract:**

In this article we show numerically that the entire flow geometry of a vertical diverging or converging channel with laminar natural convection can be optimized for maximal heat transfer rate density (total heat transfer rate per unit of flow system volume). The geometry is free to change in three ways: (1) the spacing between the walls, (2) the distribution of heating along the walls, and (3) the angle between the two walls. Numerical simulations cover the Rayleigh number range 10^{5}[less-than or equal to] Ra_{H}[less-than or equal to] 10^{7}, where H is the channel height. Nonuniform wall heating is modeled as an isothermal patch of varying height H_{0}( [less-than or equal to] H) on each wall, which is placed either at the bottom (entrance) end of the channel, or at the top (exit) end. The results confirm that the use of upper unheated sections enhances the chimney effect and the heat transfer. The new aspect is that the heat transfer rate density decreases because the unheated sections increase the total volume. It is shown that for maximal heat transfer rate density it is better to place the H_{0}sections at the channel entrance. It is also shown that the optimal angle between the two walls is approximately zero when Ra_{H}is large, i.e., for maximal heat transfer rate density the walls should be parallel or nearly parallel. Finally, the optimized spacing (I) developed in the presence of (2) and (3) as additional degrees of freedom is of the same order of magnitude as the optimal spacing reported earlier for parallel isothermal walls, i.e., in the absence of features (2) and (3). The robustness of the optimized flow architecture is discussed. Additional degrees of freedom and global objectives that may be incorporated in this constructal approach are the curvature of the facing walls and the mechanical strength and stiffness of the confining walls.**Keywords:**

Channel flow;Natural convection;Degrees of freedom (mechanics);Isotherms;Stiffness;Coolants;Prandtl number;Thermal conductivity;Specific heat;