Tuesday, December 13, 2022

Flying snakes help scientists design new robots

Computational modeling reveals the mechanism by which an undulating, flying snake can achieve lift and glide hundreds of feet

Peer-Reviewed Publication

AMERICAN INSTITUTE OF PHYSICS

Paradise tree snake and vortex structures 

IMAGE: (1) A PARADISE TREE SNAKE, CHRYSOPELEA PARADISE, GLIDING IN AIR. (2) 3D SNAKE BODY MODEL WITH SKELETAL JOINTS FOR HORIZONTAL UNDULATION. (3) VORTEX STRUCTURES OF THE UNDULATING SNAKE. (4) SPANWISE VORTICITY CONTOURS AT DIFFERENT SLICE-CUTS ALONG THE BODY. (5) EFFECTS OF THE UNDULATING FREQUENCY ON THE AERODYNAMIC PERFORMANCE OF THE GLIDING SNAKE. view more 

CREDIT: JACK SOCHA (1) AND YUCHEN GONG (2-5)

WASHINGTON, Dec. 13, 2022 – Robots have been designed to move in ways that mimic animal movements, such as walking and swimming. Scientists are now considering how to design robots that mimic the gliding motion exhibited by flying snakes.

In Physics of Fluids, by AIP Publishing, researchers from the University of Virginia and Virginia Tech explored the lift production mechanism of flying snakes, which undulate side-to-side as they move from the tops of trees to the ground to escape predators or to move around quickly and efficiently. The undulation allows snakes to glide for long distances, as much as 25 meters from a 15-meter tower.

To understand how the undulations provide lift, the investigators developed a computational model derived from data obtained through high-speed video of flying snakes. A key component of this model is the cross-sectional shape of the snake's body, which resembles an elongated frisbee or flying disc.

The cross-sectional shape is essential for understanding how the snake can glide so far. In a frisbee, the spinning disc creates increased air pressure below the disc and suction on its top, lifting the disc into the air. To help create the same type of pressure differential across its body, the snake undulates side to side, producing a low-pressure region above its back and a high-pressure region beneath its belly. This lifts the snake and allows it to glide through the air.

"The snake's horizontal undulation creates a series of major vortex structures, including leading edge vortices, LEV, and trailing edge vortices, TEV," said author Haibo Dong of the University of Virginia. "The formation and development of the LEV on the dorsal, or back, surface of the snake body plays an important role in producing lift."

The LEVs form near the head and move back along the body. The investigators found that the LEVs hold for longer intervals at the curves in the snake's body before being shed. These curves form during the undulation and are key to understanding the lift mechanism.

The group considered several features, such as the angle of attack that the snake forms with the oncoming airflow and the frequency of its undulations, to determine which were important in producing glide. In their natural setting, flying snakes typically undulate at a frequency between 1-2 times per second. Surprisingly, the researchers found that more rapid undulation decreases aerodynamic performance.

"The general trend we see is that a frequency increase leads to an instability in the vortex structure, causing some vortex tubes to spin. The spinning vortex tubes tend to detach from the surface, leading to a decrease in lift," said Dong.

The scientists hope their findings will lead to increased understanding of gliding motion and to a more optimal design for gliding snake robots.

###

The article "Computational analysis of vortex dynamics and aerodynamic performance in flying-snake-like gliding flight with horizontal undulation" is authored by Yuchen Gong, Junshi Wang, Wei Zhang, Jake Socha, and Haibo Dong. The article will appear in Physics of Fluids on Dec. 13, 2022 (DOI: 10.1063/5.0125546). After that date, it can be accessed at https://doi.org/10.1063/5.0125546.

ABOUT THE JOURNAL

Physics of Fluids is devoted to the publication of original theoretical, computational, and experimental contributions to the dynamics of gases, liquids, and complex fluids. See https://aip.scitation.org/journal/phf.

###

No comments: