Long known as curious mathematical objects lacking a separate "inside" and "outside," Möbius strips have also captured the imagination of artists like M. C. Escher, whose painting Möbius Strip II ...

The mobius strip, a geometrical object with no beginning and end, is gaining popularity in public art and among corporations, which view it as a way to symbolize transformation, evolution and ...

A Möbius band is a two-dimensional surface with the puzzling property of having only one side. Despite this mind-bending characteristic, it’s an easy object to make: just take a long strip of paper, ...

The enigmatic Möbius strip has long been an object of fascination, appearing in numerous works of art, most famously a woodcut by the Dutchman M.C. Escher, in which a tribe of ants traverses the ...

Visually, the “Klein bottle” doesn’t seem all that impressive. On first glance it looks like a trendy Japandi-style vase. And yet it has fascinated mathematicians for more than 140 years. To ...

M. C. Escher sketched them in pencil, now scientists are creating them out of photons. Möbius strips are a three-dimensional shapes with only one surface. It’s not hard to make one yourself: take a ...

In 1858, August Mobius dreamt up a shape with a single surface and only one edge. The Mobius strip has fascinated children and scientists alike since then. How small can these shapes be? In December ...

A newly derived set of differential equations provides a numerical solution to the classic question of predicting the shape of a Möbius strip. To explain the notion of a developable strip it will be ...