Characterization of Product Measures by Integrability Condition

It is natural to ask whether "positivity" of white noise operators can be discussed in some sense and characterized. To answer this question, we consider the Gel'fand triple over the Complex Gaussian space $(\ce'_c,\m_c)$, i.e. $\ce'_c=\ce'+i\ce'$ equipped with the product measure $\m_c=\m'\times\m'$ where $\m'$ is the Gaussian measure on $\ce'$ with variance 1/2 (Section \ref{sec:2-2}). Following AKK's Legendre transform technique, we have $\cw_{u_1,u_2}\subset L^2(\ce'_c,\m_c)\subset [\cw]^{*}_{u_1,u_2}$ for functions $u_1,u_2\in C_{+,1/2}$ satisfying (U0)(U2)(U3). Several examples for $u_1, u_2$ are given in Section \ref{sec:2-3}. We remark that Ouerdiane \cite{oue} studied a special case $u_1(r^2)=u_2(r^2)=\exp(k^{-1}r^k)$, where $1\leq k\leq 2$. In Section \ref{sec:3}, the characterization theorem for measures can be extended to the case of positive product Radon measures on $\ce'\times \ce'$. In addition, the notion of pseudo-positive operators is naturally introduced via kernel theorem and characterized by an integrability condition. Lemma \ref{lem:3-2} plays crucial roles in Section \ref{sec:3}.