Sulalitha Priyankara, K.Balasuriya, S.Bollt, E.2017-11-022017-11-022017International Journal of Bifurcation and Chaos in Applied Sciences and Engineering, 2017; 27(10):1750156-1-1750156-190218-12741793-6551http://hdl.handle.net/2440/109305We analyze chaos in the well-known nonautonomous Double-Gyre system. A key focus is on folding, which is possibly the less-studied aspect of the “stretching+folding=chaos” mantra of chaotic dynamics. Despite the Double-Gyre not having the classical homoclinic structure for the usage of the Smale–Birkhoff theorem to establish chaos, we use the concept of folding to prove the existence of an embedded horseshoe map. We also show how curvature of manifolds can be used to identify fold points in the Double-Gyre. This method is applicable to general nonautonomous flows in two dimensions, defined for either finite or infinite times.en© World Scientific Publishing CompanyChaos; horseshoe map; Double-Gyre; transverse intersection; curvatureJournal article003007687210.1142/S02181274175015650004129417000112-s2.0-85031291792286524Balasuriya, S. [0000-0002-3261-7940]