We provide a complete characterisation of the Root solution to the Skorokhod embedding problem (SEP) by means of an optimal stopping formulation. Our methods are purely probabilistic and the analysis relies on a tailored time-reversal argument. This approach allows us to address the long-standing question of a multiple marginals extension of the Root solution of the SEP. Our main result establishes a complete solution to the n-marginal SEP using first hitting times of barrier sets by the time–space process. The barriers are characterised by means of a recursive sequence of optimal stopping problems. Moreover, we prove that our solution enjoys a global optimality property extending the one-marginal Root case. Our results hold for general, on...
AbstractLet (Xt)t⩾0 be a non-singular (not necessarily recurrent) diffusion on R starting at zero, a...
The Azéma-Yor solution (respectively the Perkins solution) of the Skorokhod embedding problem has t...
The Azéma–Yor solution (resp., the Perkins solution) of the Skorokhod embedding problem has the prop...
We provide a complete characterisation of the Root solution to the Skorohod embedding problem (SEP) ...
We consider here an n-marginal Skorokhod embedding problem (SEP). We construct an explicit solution ...
We solve the n-marginal Skorokhod embedding problem for a continuous local martingale and a sequence...
International audienceThe Skorokhod embedding problem aims to represent a given probability measure ...
Abstract. The Skorokhod embedding problem is to represent a given probability as the distribution of...
We solve the Skorokhod embedding problem (SEP) for a general time-homogeneous diffusion X: given a d...
Recently, the problem of finding robust bounds on option\r\nprices which incorporate information fro...
The classical Skorokhod embedding problem for a Brownian motion W asks to find a stopping time τ so ...
International audienceThis paper examines the Root solution of the Skorohod embedding problem given ...
Root's solution (Root [1969]) to the Skorokhod embedding problem can be described as the first hitti...
We provide a new probabilistic proof of the connection between Rost’s solution of the Skorokhod embe...
Integrability of solutions of the Skorokhod embedding problem for diffusions David Hobson* Suppose X...
AbstractLet (Xt)t⩾0 be a non-singular (not necessarily recurrent) diffusion on R starting at zero, a...
The Azéma-Yor solution (respectively the Perkins solution) of the Skorokhod embedding problem has t...
The Azéma–Yor solution (resp., the Perkins solution) of the Skorokhod embedding problem has the prop...
We provide a complete characterisation of the Root solution to the Skorohod embedding problem (SEP) ...
We consider here an n-marginal Skorokhod embedding problem (SEP). We construct an explicit solution ...
We solve the n-marginal Skorokhod embedding problem for a continuous local martingale and a sequence...
International audienceThe Skorokhod embedding problem aims to represent a given probability measure ...
Abstract. The Skorokhod embedding problem is to represent a given probability as the distribution of...
We solve the Skorokhod embedding problem (SEP) for a general time-homogeneous diffusion X: given a d...
Recently, the problem of finding robust bounds on option\r\nprices which incorporate information fro...
The classical Skorokhod embedding problem for a Brownian motion W asks to find a stopping time τ so ...
International audienceThis paper examines the Root solution of the Skorohod embedding problem given ...
Root's solution (Root [1969]) to the Skorokhod embedding problem can be described as the first hitti...
We provide a new probabilistic proof of the connection between Rost’s solution of the Skorokhod embe...
Integrability of solutions of the Skorokhod embedding problem for diffusions David Hobson* Suppose X...
AbstractLet (Xt)t⩾0 be a non-singular (not necessarily recurrent) diffusion on R starting at zero, a...
The Azéma-Yor solution (respectively the Perkins solution) of the Skorokhod embedding problem has t...
The Azéma–Yor solution (resp., the Perkins solution) of the Skorokhod embedding problem has the prop...