Let
E be an arbitrary real Banach space and
K be a nonempty closed convex subsets of
E.Let
T:
K→
K be a uniformly continuous Φ hemicontractive operator with bounded range and {
an},{
bn},{
cn},{
a′
n},{
b′
n},{
c′
n} be sequences in[0,1] satisfying: 1)
an+
bn+
cn=
a′
n+
b′
n+
c′
n=1.∀
n=0;ii)lim
bn=lim
b′
n;iii)
;iv)
cn-ο(
bn). For any given
x0,
u0,
v0∈
K, define the Ishikawa type iterative sequence {
xn} as follows:
where {
un} and {
vn} are bounded sequences in
K.Then {
xn} converges strongly to the unique fixed point of
T.Related result deals with the convergence of Ishikawa type iterative sequence to the solution of Φ-strongly accretive operator equations.