L. Ambrosio, E. Durand-Cartagena:
Metric differentiability of Lipschitz maps defined on Wiener spaces
Rend. Circ. Mat. Palermo  Vol. 2, N. 58, p. 1-10, 2009

E. Durand-Cartagena, A. Lemenant:
Some Stability results under domain variation for Neumann problems in metric spaces
Ann. Ac. Sci. Fen. Math.  Vol. 35, p. 1-27, 2010

L. Ambrosio, E. Durand-Cartagena:
Stepanov's Theorem in Wiener spaces
(Preprint) 2010

E. Durand-Cartagena, J. Tyson:
Rectifiable curves in Sierpinski carpets
Indiana Univ. Math. J. Vol. 60, p. 285-310., 2011

E. Durand-Cartagena, N. Shanmugalingam, A. Williams:
$p$-Poincaré inequality vs. infinity-Poincaré inequality; some counter-examples
Math. Z.  Vol. 271, p. 447--467, 2012

E. Durand-Cartagena, J. Á. Jaramillo, N. Shanmugalingam:
First order Poincaré inequalities in metric measure spaces
Ann. Ac. Sci. Fen. Math.  Vol. 38, p. 287--308, 2013

E. Durand-Cartagena, X. Li:
Preservation of $p$-Poincaré inequality for large $p$ under sphericalization and flattening
Illinois Journal of Mathematics Vol. 59, N. 4, p. 1043-1069, 2015

A. Daniilidis, G. David, E. Durand-Cartagena, A. Lemenant:
Rectifiability of Self-contracted curves in the euclidean space and applications
Journal of Geometric Analysis Vol. 25, p. 1211-1239, 2015

E. Durand-Cartagena, J. Á. Jaramillo, N. Shanmugalingam:
Geometric characterizations of $p$-Poincaré inequalities
Pub. Mat. Vol. 60, p. 81-111, 2016

E. Durand-Cartagena, X. Li:
Preservation of bounded geometry under sphericalization and flattening: quasiconvexity and $\infty$-Poincaré inequality
Ann. Ac. Sci. Fen. Math Vol. 42, p. 1-22, 2017

A. Daniilidis, R. Deville, E. Durand-Cartagena, L. Rifford:
Self contracted curves in Riemannian manifolds
J. Math. Anal. Appl. Vol. 457, p. 1333-1352, 2018

E. Durand-Cartagena, A. Lemenant:
Self-contracted curves are gradient flows of convex functions
Proc. AMS (Preprint) 2018

A. Daniilidis, R. Deville, E. Durand-Cartagena:
Metric and geometric relaxations of self-contracted curves
(Preprint) 2018

E. Durand-Cartagena, J. Gong, J. Á. Jaramillo:
Sierpinski-type fractals are differentiably trivial
(Preprint) 2018

E. Durand-Cartagena, J. Á. Jaramillo, N. Shanmugalingam:
Existence and uniqueness of $\infty$-harmonic functions under assumption of $\infty$-Poincaré inequality
Mathematische Annalen (Accepted Paper) 2018

E. Durand-Cartagena, S. Eriksson-Bique, R. Korte, N. Shanmugalingam:
Equivalence of two BV classes of functions in metric spaces, and existence of a Semmes family of curves under a $1$-Poincaré inequality
Advances in Calculus of Variations (Accepted Paper) 2019