Differential growth processes play a prominent role in shaping leaves and biological tissues. Using both analytical and numerical calculations, we consider the shapes of closed, elastic strips which have been subjected to an inhomogeneous pattern of swelling. The stretching and bending energies of a closed strip are frustrated by compatibility constraints between the curvatures and metric of the strip. To analyze this frustration, we study the class of “conical” closed strips with a prescribed metric tensor on their center line. The resulting strip shapes can be classified according to their number of wrinkles and the prescribed pattern of swelling. We use this class of strips as a variational ansatz to obtain the minimal energy shapes of c...
We solve several problems that involve imposing metrics on surfaces. The problem of a strip with a l...
A one-dimensional model for a narrow ribbon is derived from the plate theory of Kirchhoff by means o...
We study the wrinkling of a thin elastic sheet caused by a prescribed non-Euclidean metric. This is ...
Differential growth processes play a prominent role in shaping leaves and biological tissues. Using ...
Differential growth processes play a prominent role in shaping leaves and biological tissues. Using ...
Thin strips or sheets with in-plane curvature have a natural tendency to adopt highly symmetric shap...
Leaves and flowers frequently have a characteristic rippling pattern at their edges. Recent experime...
I consider the problem of a thin membrane on which a metric has been prescribed, for example by lith...
International audienceAn elastic strip is transversely clamped in a curved frame. The induced curvat...
We show that thin rectangular ribbons, defined as energy-minimizing configurations of the Sadowsky f...
© Springer Science+Business Media Dordrecht 2015. We formulate the problem of finding equilibrium sh...
The edges of torn plastic sheets and growing leaves often display hierarchical buckling patterns. We...
Folding a strip of paper generates extremely localized plastic strains. The relaxation of the residu...
We consider thin plates whose energy density is a quadratic function of the difference between the s...
We solve several problems that involve imposing metrics on surfaces. The problem of a strip with a l...
A one-dimensional model for a narrow ribbon is derived from the plate theory of Kirchhoff by means o...
We study the wrinkling of a thin elastic sheet caused by a prescribed non-Euclidean metric. This is ...
Differential growth processes play a prominent role in shaping leaves and biological tissues. Using ...
Differential growth processes play a prominent role in shaping leaves and biological tissues. Using ...
Thin strips or sheets with in-plane curvature have a natural tendency to adopt highly symmetric shap...
Leaves and flowers frequently have a characteristic rippling pattern at their edges. Recent experime...
I consider the problem of a thin membrane on which a metric has been prescribed, for example by lith...
International audienceAn elastic strip is transversely clamped in a curved frame. The induced curvat...
We show that thin rectangular ribbons, defined as energy-minimizing configurations of the Sadowsky f...
© Springer Science+Business Media Dordrecht 2015. We formulate the problem of finding equilibrium sh...
The edges of torn plastic sheets and growing leaves often display hierarchical buckling patterns. We...
Folding a strip of paper generates extremely localized plastic strains. The relaxation of the residu...
We consider thin plates whose energy density is a quadratic function of the difference between the s...
We solve several problems that involve imposing metrics on surfaces. The problem of a strip with a l...
A one-dimensional model for a narrow ribbon is derived from the plate theory of Kirchhoff by means o...
We study the wrinkling of a thin elastic sheet caused by a prescribed non-Euclidean metric. This is ...