Suppose E is an arbitrary real Banach space and K is a nonempty closed conv
ex and bounded subset of E. Suppose T: K --> K is a uniformly continuous st
rong pseudo-contraction with constant k is an element of (0, 1). Suppose {a
(n)}, {b,(n)}, {c(n)}, {a(n)'}, {b(n)'}, and {c(n)'} are sequences in (0, 1
) satisfying the following conditions: (i) a(n) + b(n) + c(n) = 1 = a(n)' b(n)' + c(n)' For All integers n greater than or equal to 0; (ii) lim b(n)
= lim b(n)' = lim c(n)' = 0; (iii) Sigma b(n) = infinity; (iv) Sigma c(n)
< infinity. For arbitrary x(0), u(0), v(0) is an element of K, define the s
equence {x(n)}(n=0)(infinity) iteratively by x(n+1) = a(n)x(n) + b(n)Ty(n)
+ c(n)u(n); y(n) = a(n)'x(n) + b(n)'Tx(n) + c(n)'v(n), n greater than or eq
ual to 0, where {u(n)}, {v(n)} are arbitrary sequences in K. Then {x(n)} co
nverges strongly to the unique fixed point of T. Related results deal with
the iterative solutions of nonlinear equations involving set-valued, strong
ly accretive operators. (C) 1998 Academic Press.