Meeting with professor M.A. Hann
Some weeks ago, following Steve’s suggestion we met professor M. A. Hann, teacher at University of Leeds and director of ULITA (University of Leeds International Textile Archive). He was pleased to hear from us, also because he has deep interest in Leeds’ History and since our first meeting he gave us some materials and he invited us to his lectures.
He told us that his researches have brought him around the world (except Italy, where he’s like to come) especially t the far East (China, Korea, Japan…). He studies patterns, structure and their relationship with culture. He’s also deeply interested in mathematics and how numbers series is related to pattern and module in architecture and design. But,it’s better to go in order. He has two different courses here at the University, linked one to each other.
The first is “Patterns and Culture“. In those lecture Prof Hann go through paleolithic art, caves’ paintings, Mesopotamian evidences to find similar structures, pattern, use of symmetry trying to understand their meaning in those cultures and how they spread in the world and why. In relationship with trades, religion, route of communication and people migration. The aim is to give a framework to examine arts and to understand the way of cultural diffusion and the discover the innate capability of innovation of different communities.
The second one, named “Design theory 2” is for older students, and it’s about universal principles governing structures, forms and performances in design and architecture. He kept saying that it could sound a lot about mathematics and boring things but, actually, symmetry and basics geometry is the starting point of every pattern. So he went through many existing pattern in building, and old paintings trying to answer the same questions:
How they can be rationalized?
How the space is divided?
We will discuss both two and three-dimensional stuff, try to individuate equilateral triangles, squares, hexagons an the rules that organize them: symmetry, rotation, repetition.. And that why he started his lesson showing us the Scuola di Atene, by Raffaello, whit Euclide drowning with a compasses. The key is to find a rule in the complexity, the regular basis on which a particular element is repeated.. Thus you’ll discover that from minimum inventory you’ll get maximum diversity.
I’ve linked prof. Hann’s books to the course names for any further information.