A new class of partial orders

Abstract

Let R be a unital *-ring. For any a,w,b∈ R, we apply the defined w-core inverse to define a new class of partial orders in R, called the w-core partial order. Suppose a,b∈ R are w-core invertible. We say that a is below b under the w-core partial order, denoted by a\#≤w b, if aw\# a=aw\# b and awaw\# =bwaw\#, where aw\# denotes the w-core inverse of a. Characterizations of the w-core partial order are given. Also, the relationships with several types of partial orders are considered. In particular, we show that the core partial order coincides with the a-core partial order, and the star partial order coincides with the a*-core partial order.