|Workshop on Geometric Functionals: Analysis and Applications|
|Topic:||One-cycle sweepout estimates of essential surfaces in closed Riemannian manifolds|
|Affiliation:||Université Paris-Est Créteil|
|Date:||Thursday, March 7|
|Time/Room:||11:30am - 12:30pm/Simonyi Hall 101|
Abstract: We present new-curvature one-cycle sweepout estimates in Riemannian geometry, both on surfaces and in higher dimension. More precisely, we derive upper bounds on the length of one-parameter families of one-cycles sweeping out essential surfaces in closed Riemannian manifolds. In particular, we show that there exists a homotopically substantial one-cycle sweepout of the essential sphere in the complex projective space, endowed with an arbitrary Riemannian metric, whose one-cycle length is bounded in terms of the volume (or diameter) of the manifold. This is the first estimate on sweepout volume in higher dimension without curvature assumption.