At the intersection of mathematics and nature, scientists have found intriguing and often beautiful designs. Pinecone scales ...

Minimal surfaces, defined informally as surfaces that locally minimise area, have long captivated both mathematicians and physicists due to their elegant geometric properties and rich analytical ...

We show that the Clifford torus and the totally geodesic real projective plane ℝℙ2 in the complex projective plane ℂℙ2 are the unique Hamiltonian stable minimal Lagrangian compact surfaces of ℂℙ2 with ...

With the rapid development of material science and manufacturing science, a large number of complex structures have been designed, manufactured and applied in the industrial field. Most of the current ...

Geometric measure theory provides a rigorous framework for studying and quantifying the properties of sets and surfaces in Euclidean spaces. This discipline blends techniques from differential ...