Theorem puts new twist on topology of minimal surfaces
HOUSTON, Oct. 31, 2005 – It has been almost 230 years since French general and mathematician Jean Meusnier's study of soap films – the same kind used by children today to blow bubbles -- led to one of the fundamental mathematical examples in geometric optimization. Meusnier showed that one of nature's simplest geometric figures – an ordinary two-dimensional plane -- could be twisted infinitely into a helicoid, a shape that has the delicate balance everywhere of a soap film.
Meusnier offered mathematical proof that the helicoid – which resembles a parking garage ramp -- was a "minimal" surface, meaning that each part of the surface had the same shape as a curved soap film. In new findings published online today by the Proceedings of the National Academy of Sciences, a team of mathematicians from Rice, Stanford and Indiana universities offers the first proof since Meusnier's for a new type of minimal surface that meets the same criteria of being an infinitely twisted version of a fundamentally simple shape.
Mathematicians Matthias Weber of Indiana, David Hoffman of Stanford and Michael Wolf of Rice call the new surface a "genus one helicoid." From far away, the surface looks much like Meusnier's helicoid. However, when untwisted, the new shape differs from the flat plane of Meusnier's untwisted helicoid in a key way: It has a curved handle, much like the handle one might find on the flat lid of a kitchen pot.
"A soap film spanning a bent coathanger -- regardless of how many twists you add to the hanger -- will use the least amount of material necessary to do that work of spanning," said Wolf, professor and chair of the Rice's Department of Mathematics. "This was a natural optimization problem for 18th and 19th century geometers and physicists to study, and it shed light on many problems where one is interested in the best or most efficient shape to serve a purpose.
"What mathematicians are finding in the past 25 years is that these surfaces are far more abundant than most people ever dreamed," Wolf said. "Until recently, most people would have guessed that any attempt to sew a handle onto a helicoidal soap film would have destroyed the soap film, even theoretically."
Hoffman and colleagues first identified the shape of the genus one helicoids in 1992, but the latest paper offers the first full theoretical proof that the new shape never doubles back to intersect itself.
Given the high-powered computational tools available in the 21st Century, one might expect that Weber, Hoffman and Wolf's proof would contain computer code or computational tools unavailable to an 18th Century scholar like Meusnier. In reality, the two documents are more similar than not, Wolf said.
"Computers have certainly influenced some aspects of mathematical research," Wolf said. "Mathematicians can use computers to experiment with some of the phenomena they study in very sophisticated ways. In this case, my collaborators had strong numerical evidence that what we were trying to prove was true and that our basic approach reflected what was true in nature.
"However, mathematicians still require the same sort of airtight, absolutely convincing argument that they always have," Wolf said. "Providing that was the challenge here, even after we were quite sure that this surface existed."
The proof itself runs more than 100 pages and contains no computational evidence, only prose and logic.
Wolf said that while it is impossible to predict how the research will be applied to specific scientific problems, history has shown time and again that mathematical discoveries are almost invariably transmitted and transformed into useful solutions for society.
"I don't know of a practical use of a helicoid with a handle, but now I know that soap films are more flexible than they were once thought to be," Wolf said. "That adds to our understanding of shapes and optimization, and though there is an excitingly broad range of possibilities, no one can ever really know where it will lead."
Source: Eurekalert & othersLast reviewed: By John M. Grohol, Psy.D. on 21 Feb 2009
Published on PsychCentral.com. All rights reserved.
We teach people how to remember, we never teach them how to grow.
-- Oscar Wilde