Pages that link to "Item:Q906768"

The following pages link to A limit theorem on the convergence of random walk functionals to a solution of the Cauchy problem for the equation \( \frac{\partial u}{\partial t}=\frac{\sigma^2}{2}\Delta u \) with complex \(\sigma\) (Q906768):

Displaying 11 items.

• On an approximation for the solutions of some evolution equations by the expectations of random walks functionals (Q292337) (← links)
• Limit theorems for symmetric random walks and probabilistic approximation of the Cauchy problem solution for Schrödinger type evolution equations (Q744971) (← links)
• Continuous time random walks and the Cauchy problem for the heat equation (Q1713988) (← links)
• A probabilistic approximation of the evolution operator \(\operatorname{exp}(t(S\nabla,\nabla))\) with a complex matrix \(S\) (Q2199126) (← links)
• Probabilistic representations for solutions to initial boundary value problems for non-stationary Schrödinger equation in \(d\)-hyperball (Q2206296) (← links)
• Reflecting Brownian motion in the \(d\)-ball (Q2246212) (← links)
• Limit theorems on convergence to generalized Cauchy type processes (Q2246217) (← links)
• An approach to the pseudoprocess driven by the equation \(\frac{\partial}{\partial t}=-A\frac{\partial^3}{\partial x^3}\) by a random walk (Q2258607) (← links)
• Random flights connecting porous medium and Euler–Poisson–Darboux equations (Q3298900) (← links)
• Initial Boundary Value Problems in a Bounded Domain: Probabilistic Representations of Solutions and Limit Theorems II (Q4580418) (← links)
• Limit Theorems on Convergence of Expectations of Functionals of Sums of Independent Random Variables to Solutions of Initial-Boundary Value Problems (Q5255336) (← links)