AbstractThe problem of non-confluence and strong comparison of solutions of one-dimensional Itô stochastic differential equations is studied. Sufficient conditions which guarantee these properties in the case of non-degenerate diffusion coefficient are given. In the case of possibly degenerate diffusion coefficient the notion of almost strong comparison is introduced and studied. In both cases discontinuous drift coefficients are allowed
Comparison theorems for solutions of one-dimensional backward stochastic differential equations were...
Motivated by open problems of well posedness in fluid dynamics, two topics related to strong solutio...
The existence of a mean-square continuous strong solution is established for vector-valued Ito ̂ sto...
AbstractThe problem of non-confluence and strong comparison of solutions of one-dimensional Itô stoc...
AbstractIn this paper, we present a new approach to obtain the comparison theorem of two 1-dimension...
In this paper, we directly prove the existence and uniqueness of a strong solution of the stochastic...
In this paper, we will consider the existence of a strong solution for stochastic differential equat...
Pathwise comparison of solutions to a class of stochastic systems of differential equations is prove...
We show the existence of strong solutions and pathwise uniqueness for two types of one-dimensional s...
We prove comparison theorems for systems of ordinary stochastic differential equations as well as fo...
AbstractIn this paper, we directly prove the existence and uniqueness of a strong solution of the st...
We obtain sufficient condition for SDEs to evolve in the positive orthant. We use arguments based on...
We consider a system of stochastic differential equations driven by a standard n-dimensional Browni...
AbstractWe prove comparison theorems for systems of ordinary stochastic differential equations as we...
We present a well-posedness result for strong solutions of one-dimensional stochastic differential e...
Comparison theorems for solutions of one-dimensional backward stochastic differential equations were...
Motivated by open problems of well posedness in fluid dynamics, two topics related to strong solutio...
The existence of a mean-square continuous strong solution is established for vector-valued Ito ̂ sto...
AbstractThe problem of non-confluence and strong comparison of solutions of one-dimensional Itô stoc...
AbstractIn this paper, we present a new approach to obtain the comparison theorem of two 1-dimension...
In this paper, we directly prove the existence and uniqueness of a strong solution of the stochastic...
In this paper, we will consider the existence of a strong solution for stochastic differential equat...
Pathwise comparison of solutions to a class of stochastic systems of differential equations is prove...
We show the existence of strong solutions and pathwise uniqueness for two types of one-dimensional s...
We prove comparison theorems for systems of ordinary stochastic differential equations as well as fo...
AbstractIn this paper, we directly prove the existence and uniqueness of a strong solution of the st...
We obtain sufficient condition for SDEs to evolve in the positive orthant. We use arguments based on...
We consider a system of stochastic differential equations driven by a standard n-dimensional Browni...
AbstractWe prove comparison theorems for systems of ordinary stochastic differential equations as we...
We present a well-posedness result for strong solutions of one-dimensional stochastic differential e...
Comparison theorems for solutions of one-dimensional backward stochastic differential equations were...
Motivated by open problems of well posedness in fluid dynamics, two topics related to strong solutio...
The existence of a mean-square continuous strong solution is established for vector-valued Ito ̂ sto...