Constructing Kähler-Ricci solitons from Sasaki-Einstein manifolds
Constructing mean curvature 1 surfaces in $H^3$ with irregular ends
Constructing metrics on a $2$-torus with a partially prescribed stable norm
Constructing Piecewise Flat Pseudo-Manifolds with Minimal Pseudo-Foliations
Constructing Smooth Loop Spaces
Constructing special Lagrangian m-folds in C^m by evolving quadrics
Construction de valeurs propres doubles du laplacien de Hodge-de Rham
Construction of Complete Embedded Self-Similar Surfaces under Mean Curvature Flow. Part I
Construction of Complete Embedded Self-Similar Surfaces under Mean Curvature Flow. Part II
Construction of Complete Embedded Self-Similar Surfaces under Mean Curvature Flow. Part III
Construction of Conformally Compact Einstein Manifolds
Construction of conjugate functions
Construction of doubly-periodic instantons
Construction of Einstein metrics by generalized Dehn filling
Construction of Hamiltonian-minimal Lagrangian submanifolds in complex Euclidean space
Construction of harmonic diffeomorphisms and minimal graphs
Construction of homogeneous Lagrangian submanifolds in $\CP^n$ and Hamiltonian stability
Construction of Kaehler surfaces with constant scalar curvature
Construction of Local Conservation Laws by Generalized Isometric Embeddings of Vector Bundles
Construction of Ricci-type connections by reduction and induction