Schwankung von Polynomen zwischen Gitterpunkten. (Oscillations of polynomials between lattice points). (German) Zbl 0131.06602
Keywords:
approximation and series expansionReferences:
| [1] | Elbert, Á., u.A. Sárközy: Über rationale Polynome. Ann. Univ. Sci. Budapest. Eötvös Sect. Math.5, 155-171 (1962). · Zbl 0111.26602 |
| [2] | Erdös, P.: On some convergence properties of the interpolation polynomials. Annals of Math.44, 330-337 (1943). · Zbl 0063.01266 · doi:10.2307/1968768 |
| [3] | ?, andG. Szegö On a problem of I. Schur. Annals of Math.43, 451-470 (1942) · Zbl 0060.05503 · doi:10.2307/1968803 |
| [4] | ? andP. Turán: On the uniformly-dense distribution of certain sequences of points. Annals of Math.41, 162-173 (1940a). · JFM 66.0347.01 · doi:10.2307/1968824 |
| [5] | ??: On interpolation. III. Interpolatory theory of polynomials. Annals of Math.41, 510-553 (1940b). · Zbl 0024.39102 · doi:10.2307/1968733 |
| [6] | Riesz, M.: Eine trigonometrische Interpolationsformel und einige Ungleichungen für Polynome. Jahresbericht DMV23, 354-368 (1914). · JFM 45.0405.02 |
| [7] | Schönhage, A.: Fehlerfortpflanzung bei Interpolation. Numerische Mathematik3, 62-71 (1961). · Zbl 0125.07501 · doi:10.1007/BF01386001 |
| [8] | Todd, J.: A survey of numerical analysis. (Herausgegeben vonJ. Todd.) New York-San Francisco-Toronto-London: McGraw-Hill Book Company, Inc. 1962, 589 S. |
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