Quasimultipliers on ð ¹ -Algebras

We investigate the extent to which the study of quasimultipliers can be made beyond Banach algebras. We will focus mainly on the class of ð ¹ -algebras, in particular on complete 𠑘 -normed algebras, 0 < 𠑘 ≤ 1 , not necessarily locally convex. We include a few counterexamples to demonstrate that some of our results do not carry over to general ð ¹ -algebras. The bilinearity and joint continuity of quasimultipliers on an ð ¹ -algebra ð ´ are obtained under the assumption of strong factorability. Further, we establish several properties of the strict and quasistrict topologies on the algebra ð ‘„ ð ‘€ ( ð ´ ) of quasimultipliers of a complete 𠑘 -normed algebra ð ´ having a minimal ultra-approximate identity.