Local forms of Bishop-Phelps-Bollob\'as type properties for bilinear maps

Abstract

In this paper, we characterize the so called property Lo,o as defined by Dantas and Rueda Zoca, for compact, weak-weak continuous bilinear maps. Motivated by this we weaken this property by defining the weak Lo,o for bilinear maps. We provide equivalence of the weak Lo,o property of (XπY,R) for linear functionals and that of (X,Y;R) for bilinear forms under certain conditions on X and Y. Moreover, we have also established that under certain preassigned conditions, if a bilnear map T belongs to a class which satisfies the property Lo,o (resp. the weak Lo,o) for bilinear maps, then T* is a member of a class of operators which satisfy the property Lo,o (resp. the weak Lo,o) for operators.