A homeomorphism theorem for sums of translates
Abstract
For a fixed positive integer n consider continuous functions K1,…, Kn:[-1,1] R\-∞\ that are concave and real valued on [-1,0) and on (0,1], and satisfy Kj(0)=-∞. Moreover, let J:[0,1] R\-∞\ be upper bounded and such that [0,1] J-1(\-∞\) has at least n+1 elements, but it is arbitrary otherwise. For x0:=0<x1<…< xn xn+1:=1, so called nodes, and for t∈ [0,1] consider the sum of translates function F(x1,…,xn,t):=J(t)+Σj=1n Kj(t-xj), and the vector of interval maximum values mj:=mj(x1,…,xn):=t∈ [xj,xj+1]F(x1,…,xn,t) (j=0,1,…,n). We describe the structure of the arising interval maxima as the nodes run over the n-dimensional simplex. Applications presented here range from abstract moving node Hermite-Fej\'er interpolation for generalized algebraic and trigonometric polynomials via Bojanov's problem to more abstract results of interpolation theoretic flavour.
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