Sample Functions of the $N$-Parameter Wiener Process
Sample Functions of the $N$-Parameter Wiener Process
Let $W^{(N)}$ denote the $N$-parameter Wiener process, that is a real-valued Gaussian process with zero means and covariance $\Pi^N_{i=1} (s_i \wedge t_i)$ where $s = \langle s_i\rangle, t = \langle t_i\rangle, s_i \geqq 0, t_i \geqq 0, i = 1, 2, \cdots N$. Then $W^{(N,d)}$ is to be the process …