Fixed points of nonexpansive mappings in strictly convex spaces;

In this paper the properties of the strictly convex space are studied further.

By using point valued for set-valued mappings in strictly convex Banach space,a sufficient and necessary condition for Ishikawa multistep iterative processing with errors for asymptotically quasi-nonexpansive mappings of set-valued to converge to coupled fixed point is proved.

In strictly convex Banach space,there F(T)is set of coupled fixed points of T for nonexpansive mapping,then F(T)is(closed convex set.

We prove the main result as follows:Let K be a nonempty closed convex subset of a strictly convex Banach space E,T:K→K be a continuous quasi-nonexpanaive mapping,and let T(K) be contained in a compact subset of K,iterative scheme ｛x_n｝~~∞__(n=1)definited as follow:(IS)y_n=(1-β_n)x_n+β_nTx_n,n≥1, x_(n+1)=(1-α_n)x_n+α_nTy_n,n≥1,where｛α_n｝and ｛β_n｝satisfy certain condition,then｛x_n｝c.

Existence and uniqueness for element of best approximation in strict convex Banach spaces;

In the strict convex Banach spaces, we obtained the theory of existence and uniqueness of element of best approximate on compact convex subset.