Best Simultaneous Approximation for Dunham-Type by an N-Dimensional Subspace on a Set of N+1 Points

Let X={x_0,x_1…,x_n}and let c(X)be the set of all continuous real functions on X with the Chebyshev norm. Let G=span{g_1,g_2,…,g_n}be an n-dimensional subspace of c(X).Let T={(f~+,f~-):f~+≥f~-and f~+,f~-∈c(X)}.If there exists a P∈G such that max{||f~+-P||, ||f~--P||}=inf{max{||f~+-Q||, ||f~--Q||}:Q∈G},(1) then P is called a best simultaneous approximation to(f~+,f~-)from G.