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<h1>CVGMT Weekly Bulletin</h1>
<h2>Summary</h2>
<p><b>Seminars by:</b> <a href='/seminar/452/'>Chambolle</a></p>
<p><b>New papers by:</b> <a href='/person/192/' >Masnou</a>, <a >Bretin</a>, <a >Henrot</a>, <a href='/person/151/' >Pratelli</a>, <a >Acciaio</a>, <a >Saracco</a>, <a >Dalphin</a>, <a >Takahashi</a>, <a href='/person/254/' >Leonardi</a></p>
<p><b>Modified papers by:</b> <a href='/person/3/'>Ambrosio</a>, <a href='/person/132/'>Fonseca</a>, <a >Puglisi</a>, <a href='/person/151/'>Pratelli</a>, <a >Krejcirik</a>, <a href='/person/1176/'>Cinti</a>, <a >Flandoli</a>, <a href='/person/544/'>Cesaroni</a>, <a >Beiglböck</a>, <a href='/person/1573/'>Maggiani</a>, <a >Morgan</a>, <a >Valdinoci</a>, <a href='/person/186/'>Figalli</a>, <a href='/person/581/'>Nitsch</a>, <a href='/person/198/'>Brasco</a>, <a href='/person/204/'>Dal Maso</a>, <a href='/person/336/'>Velichkov</a>, <a href='/person/977/'>Mazzoleni</a>, <a href='/person/210/'>Beck</a>, <a >Dacorogna</a>, <a href='/person/217/'>Fusco</a>, <a >Carlotto</a>, <a href='/person/866/'>Massaccesi</a>, <a href='/person/100/'>Marcellini</a>, <a >Mora Corral</a>, <a href='/person/105/'>Bucur</a>, <a href='/person/239/'>Maggi</a>, <a href='/person/242/'>Daneri</a>, <a href='/person/117/'>Paolini</a>, <a href='/person/119/'>Novaga</a>, <a href='/person/1400/'>Scala</a>, <a >Antonietti</a>, <a href='/person/125/'>Van Goethem</a>, <a href='/person/638/'>Schmidt</a>, <a >Zwicknagel</a></p>
<p><b>Open positions:</b> <a href='/position/135/'>Postdoc Position in Münster</a>; <a href='/position/137/'>Postdoc Positions in Jyväskylä</a></p>
<h2>Seminars next week</h2>
<p><i>Thursday 26 feb 2015</i></p>
<p>
time: 17:00<br /> Dipartimento di Matematica, Sala seminari<br/>
<b><a href='/seminar/452/'>Korn-Poincaré inequalities for functions with a small jump set</a></b><br />
Antonin Chambolle We show hos the gradient of SBD functions can control, on "most" of the domain, their global behaviour (up to a rigid motion), provided the jump set is not too large.
This is a joint work with Sergio Conti and Gilles Francfort.<br />
<h2>New Papers</h2>
<p><b> Leonardi, Pratelli:</b> <a href='/paper/2624/'>On the Cheeger sets in strips and non-convex domains</a></p>
<p><b> Pratelli:</b> <a href='/paper/2625/'>A survey on the existence of isoperimetric sets in the space $\mathbb R^N$ with density</a></p>
<p><b> Acciaio, Pratelli:</b> <a href='/paper/2626/'>On the minimization of area among chord-convex sets</a></p>
<p><b> Pratelli, Saracco:</b> <a href='/paper/2627/'>On the generalized Cheeger problem and an application to 2d strips</a></p>
<p><b> Bretin, Masnou:</b> <a href='/paper/2628/'>A new phase field model for inhomogeneous minimal partitions, and applications to droplets dynamics</a></p>
<p><b> Dalphin, Henrot, Masnou, Takahashi:</b> <a href='/paper/2629/'>On the minimization of total mean curvature</a></p>
<h2>Modified Papers</h2>
<p><b> Figalli, Maggi, Pratelli:</b> <a href='/paper/208/'>Sharp stability theorems for the anisotropic Sobolev and log-Sobolev inequalities on functions of bounded variation</a></p>
<p><b> Beck:</b> <a href='/paper/262/'>Regularity versus singularity for elliptic problems in two dimensions</a></p>
<p><b> Figalli, Maggi, Pratelli:</b> <a href='/paper/435/'>A Geometric Approach to Correlation Inequalities in the Plane</a></p>
<p><b> Beiglböck, Pratelli:</b> <a href='/paper/444/'>Duality for rectified Cost Functions</a></p>
<p><b> Figalli, Maggi, Pratelli:</b> <a href='/paper/521/'>A mass transportation approach to quantitative isoperimetric inequalities</a></p>
<p><b> Fusco, Maggi, Pratelli:</b> <a href='/paper/554/'>On the isoperimetric problem with respect to a mixed Euclidean-Gaussian density</a></p>
<p><b> Beck, Flandoli:</b> <a href='/paper/659/'>A regularity theorem for quasilinear parabolic systems under random perturbations</a></p>
<p><b> Antonietti, Pratelli:</b> <a href='/paper/767/'>Finite Element Approximation of the Sobolev Constant</a></p>
<p><b> Krejcirik, Pratelli:</b> <a href='/paper/909/'>The Cheeger constant of curved strips</a></p>
<p><b> Daneri, Pratelli:</b> <a href='/paper/1675/'>A planar bi-Lipschitz extension Theorem</a></p>
<p><b> Brasco, Pratelli:</b> <a href='/paper/1034/'>Sharp stability of some spectral inequalities</a></p>
<p><b> Dacorogna, Marcellini, Paolini:</b> <a href='/paper/1043/'>Functions with orthogonal Hessian</a></p>
<p><b> Fusco, Pratelli:</b> <a href='/paper/1138/'>On a conjecture by Auerbach</a></p>
<p><b> Ambrosio, Carlotto, Massaccesi:</b> <a href='/paper/1280/'>Lecture Notes on Partial Differential Equations</a></p>
<p><b> Figalli, Maggi, Pratelli:</b> <a href='/paper/1387/'>A refined Brunn-Minkowski inequality for convex sets</a></p>
<p><b> Daneri, Pratelli:</b> <a href='/paper/1616/'>Smooth approximation of bi-Lipschitz orientation-preserving homeomorphisms</a></p>
<p><b> Mazzoleni, Pratelli:</b> <a href='/paper/1703/'>Existence of minimizers for spectral problems</a></p>
<p><b> Brasco, Nitsch, Pratelli:</b> <a href='/paper/1721/'>On the boundary of the attainable set of the Dirichlet spectrum</a></p>
<p><b> Cesaroni, Novaga, Valdinoci:</b> <a href='/paper/1815/'>A symmetry result for the Ornstein-Uhlenbeck operator</a></p>
<p><b> Mora Corral, Pratelli:</b> <a href='/paper/1910/'>Approximation of piecewise affine homeomorphisms by diffeomorphisms</a></p>
<p><b> Morgan, Pratelli:</b> <a href='/paper/1911/'>Existence of isoperimetric regions in $\mathbb R^n$ with density</a></p>
<p><b> Cinti, Pratelli:</b> <a href='/paper/1912/'>The $\varepsilon-\varepsilon^\beta$ property, the boundedness of isoperimetric sets in $\mathbb R^N$ with density, and some applications</a></p>
<p><b> Pratelli, Puglisi:</b> <a href='/paper/2116/'>Elastic deformations on the plane and approximations</a></p>
<p><b> Dal Maso, Scala:</b> <a href='/paper/2206/'>Quasistatic evolution in perfect plasticity as limit of dynamic processes</a></p>
<p><b> Bucur, Mazzoleni, Pratelli, Velichkov:</b> <a href='/paper/2307/'>Lipschitz regularity of the eigenfunctions on optimal domains</a></p>
<p><b> Fonseca, Pratelli, Zwicknagel:</b> <a href='/paper/2364/'>Shapes of epitaxially grown quantum dots</a></p>
<p><b> Maggiani, Scala, Van Goethem:</b> <a href='/paper/2387/'>A compatible-incompatible decomposition of symmetric tensors in Lp with application to elasticity</a></p>
<p><b> Beck, Schmidt:</b> <a href='/paper/2453/'>Interior gradient regularity for BV minimizers of singular variational problems</a></p>
<h2>Open Positions</h2>
<p> <a href="/position/135/">Postdoc Position in Münster</a> (deadline: 31 Mar 2015) </p>
<p> <a href="/position/137/">Postdoc Positions in Jyväskylä</a> (deadline: 31 Mar 2015) </p>
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