Let \((X, M_X)\) and \((Y, M_Y)\) be measurable spaces. If E is a subset of \(X \times Y\) that belongs to \(M_{X} \times M_{Y}\) then each section \(E_y\) belongs to \(\hspace{1.0cm}\).
\(\M_{X \times Y}\)
\(\M_y\)
\(\M_{X \times Y}\)
—>> \(\M_x\)
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Let \((X, M_X)\) and \((Y, M_Y)\) be measurable spaces. If E is a subset of \(X \times Y\) that belongs to \(M_{X} \times M_{Y}\) then each section \(E_y\) belongs to \(\hspace{1.0cm}\).
\(\M_{X \times Y}\)
\(\M_y\)
\(\M_{X \times Y}\)
—>> \(\M_x\)