A new single-string method lets flat designs deploy into complex 3D structures, with potential uses in modular space habitats ...

MIT researchers have developed a new method for designing 3D structures that can be transformed from a flat configuration ...

Differential cohomology has emerged as a pivotal tool in modern mathematical physics, providing a refined framework that unites topological invariants with differential geometric data. In the realm of ...

Researchers have developed a method for optimizing the initial tension of strings in tensegrity structures as well as a second technique to maximize the strength and minimize the weight of the rods ...

Scientists at the University of California, San Diego (UCSD) have devised two mathematical tools considered to be a major contribution to the optimal design of a new generation of deformable bridges, ...