On semi-inner product space of type $(p)$


Endre Pap, Radoje Pavlović




In this paper we give a simple proof of the fact that every normed vector space can be made into a semi-inner product space of type $(p)$, introduced by B. Nath as a generalization of Lumer's semi-inner product space. Introducing the homogenity property of the semi-inner product of type $(p)$ we prove the Riesz Representation theorem.