TY - RPRT
T1 - Optimally swimming Stokesian Robots
Y1 - 2010
A1 - François Alouges
A1 - Antonio DeSimone
A1 - Luca Heltai
A1 - Aline Lefebvre
A1 - Benoit Merlet
AB - We study self propelled stokesian robots composed of assemblies of balls, in dimen-\\nsions 2 and 3, and prove that they are able to control their position and orientation. This is a result of controllability, and its proof relies on applying Chow\\\'s theorem in an analytic framework, similarly to what has been done in [3] for an axisymmetric system swimming along the axis of symmetry. However, we simplify drastically\\nthe analyticity result given in [3] and apply it to a situation where more complex swimmers move either in a plane or in three-dimensional space, hence experiencing also rotations. We then focus our attention on energetically optimal strokes, which we are able to compute numerically. Some examples of computed optimal strokes are discussed in detail.
UR - http://hdl.handle.net/1963/3929
U1 - 472
U2 - Mathematics
U3 - Functional Analysis and Applications
ER -
TY - CHAP
T1 - Biological Fluid Dynamics, Non-linear Partial Differential Equations
T2 - Encyclopedia of Complexity and Systems Science / Robert A. Meyers (ed.). - Springer, 2009, 548-554
Y1 - 2009
A1 - Antonio DeSimone
A1 - François Alouges
A1 - Aline Lefebvre
JF - Encyclopedia of Complexity and Systems Science / Robert A. Meyers (ed.). - Springer, 2009, 548-554
UR - http://hdl.handle.net/1963/2630
U1 - 1493
U2 - Mathematics
U3 - Functional Analysis and Applications
ER -
TY - JOUR
T1 - Optimal Strokes for Low Reynolds Number Swimmers: An Example
JF - J. Nonlinear Sci. 18 (2008) 277-302
Y1 - 2008
A1 - François Alouges
A1 - Antonio DeSimone
A1 - Aline Lefebvre
AB - Swimming, i.e., being able to advance in the absence of external forces by performing cyclic shape changes, is particularly demanding at low Reynolds numbers. This is the regime of interest for micro-organisms and micro- or nano-robots. We focus in this paper on a simple yet representative example: the three-sphere swimmer of Najafi and Golestanian (Phys. Rev. E, 69, 062901-062904, 2004). For this system, we show how to cast the problem of swimming in the language of control theory, prove global controllability (which implies that the three-sphere swimmer can indeed swim), and propose a numerical algorithm to compute optimal strokes (which turn out to be suitably defined sub-Riemannian geodesics).
PB - Springer
UR - http://hdl.handle.net/1963/4006
U1 - 396
U2 - Mathematics
U3 - Functional Analysis and Applications
ER -