The duals of some sequence spaces of a nonabsolute type (Q1087780)

Let A be an infinite matrix and Y a given normed sequence space. We define a sequence space \(X=\{x:\) Ax\(\in Y\}\) with norm \(\| x\| =\| Ax\|_ Y\) and assume that A, X and y satisfy certain conditions. This class of sequence spaces is of a nonabsolute type in the sense that if \(x\in X\), it does not necessarily imply \(| x| \in X\), and it includes the nonabsolute Cesaro sequence spaces as a special case. The second author has determined the \(\beta\)-dual of X. In this paper, we determined the \(\alpha\)-dual, \(\gamma\)-dual and the continuous dual of X with some examples given.