Concluding remarks. Perspectives and open problems
The main advantage of the homogenization method is simplicity of algorithms allowing for solving the complicated problems. Besides the problems mentioned in our book, we can notice skewed , riveted , honeycomb [75,169], reticulated , multispan [82,88] and multilink [112,131,132], folded , fissued , grid , laminated [3,59,63,64,160,161] structures. Homogenization asymptotic applications bear new ideas for mathematicians. On the other hand, some well-developed branches of homogenization [108,193,195], are still waiting for applications.