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On Best Simultaneous Approximation


Affiliations
1 Department of Mathematics, Statistics and Computing Science, University of Calgary, Calgary, Albania
2 Summer Research Institute at the Laval University, Canada
3 Summer Research Institute at Calgary, Canada
     

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Diaz and McLaughlin [1], [2] and Dunham [4] have considered the problem of simultaneous approximation of the following case: X=C [a,b], K a non-empty subset of X and F={f1,f2}. Goel, Holland, Nasim and Sahney [5], [6] studied the problem of X a normed linear space, K a subset and F = {f1 f2}.
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  • On Best Simultaneous Approximation

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Authors

A. S. B. Holland
Department of Mathematics, Statistics and Computing Science, University of Calgary, Calgary, Albania
B. N. Sahney
Summer Research Institute at the Laval University, Canada
J. Tzimbalario
Summer Research Institute at Calgary, Canada

Abstract


Diaz and McLaughlin [1], [2] and Dunham [4] have considered the problem of simultaneous approximation of the following case: X=C [a,b], K a non-empty subset of X and F={f1,f2}. Goel, Holland, Nasim and Sahney [5], [6] studied the problem of X a normed linear space, K a subset and F = {f1 f2}.