Some results of \(\tau_1 \tau_2\)-\(\delta\) semiconnectedness and compactness in bitopological spaces (Q2337102)

Summary: We are going to establish some results of \(\tau_1 \tau_2\)-\(\delta\) semiconnectedness and compactness in a bitopological space. Besides, we will investigate several results in \(\tau_1 \tau_2\)-\(\delta\) semiconnectedness for subsets in bitopological spaces. In particular, we will discuss the relationship related to semiconnectedness between the topological spaces and bitopological space. That is, if a bitopological space \((X, \tau_1, \tau_2)\) is \(\tau_1 \tau_2\)-\(\delta\) semiconnected, then the topological spaces \((X, \tau_1)\) and \((X, \tau_2)\) are \(\delta\)-semiconnected. In addition, we introduce the result which states that a bitopological space \((X, \tau_1, \tau_2)\) is \(\tau_1 \tau_2\)-\(\delta\) semiconnected if and only if \(X\) and \(\phi\) are the only subsets of \(X\) which are \(\tau_1 \tau_2\)-\(\delta\) semiclopen sets. Moreover, we have proved some results in compactness also. Altogether, several results of \(\tau_1 \tau_2\)-\(\delta\) semiconnectedness and compactness in a bitopological space have been discussed.