Guney, H. OzlemOwa, Shigeyoshi2024-04-242024-04-2420222075-79052227-5487https://doi.org/10.47013/15.4.6https://hdl.handle.net/11468/19829Let T-p,T-n be a subclass of analytic multivalent functions of the form f(z) = z(p) + alpha(p) +n(zp+n) + alpha(p) +n+1 z (p+n+1) +... for every z in the open unit disc U. Applying the fractional calculus (fractional integral and fractional derivative), A (lambda)(p,n) f (z) and A(p,n)(lambda) f(z) which are generalizations of the Alexander integral operator are introduced. The object of present paper is to discuss some interesting properties of A(p,n)(-lambda) f (z) and A(p,n)(-lambda)f (z). Also, some simple examples of results for A-(lambda)(p,n) f(z) and A(p,n)(lambda)f (z) are shown. To give some simple examples is very important for the research of mathematics.eninfo:eu-repo/semantics/closedAccessAnalytic FunctionFractional DerivativeFractional IntegralAlexander Integral Operator,DominantSubordinationArticle154A871894WOS:0009246279000062-s2.0-8515407267910.47013/15.4.6Q4N/A