By J.L. Bueso
This exact, self-contained referenceвЂ“the first in-depth exam of compatibility of its kindвЂ“integrates primary concepts from algebraic geometry, localization concept, and ring concept and demonstrates how every one of those themes is better by means of interplay with the others, offering new effects inside a typical framework.
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Additional resources for Compatibility, Stability, and Sheaves
Szabados, B. Underhill, and A. K. Varma), On some general lacunary interpolation problems, J. Approx. Theory 87(2) (1996) 194–219. 177. (with J. Szabados), Remarks on (0,2) interpolation, Ganita 46(1-2) (1995) 87–110. 178. (with W. Chen), Lacunary interpolation on some non-uniformly distributed nodes on the unit circle, Ann. Univ. Sci. Budapest (Sektio Computeriko) 16 (1996) 69–82. 179. (with W. Chen), Some Bernstein-Durrmeyer type operators, Methods Appl. Anal. 4(3) (1997) 239–249. 180. (with A.
P. Dikshit and A. Ojha), Certain mapping properties of rational complex planar splines, Math. Proc. Cambridge Philos. Soc. 101(1) (1987) 141–149. 139. (with T. N. T. Goodman and I. J. Schoenberg), Piecewise smooth solutions of some difference-differential equations, J. Approx. Theory 48(3) (1986) 262–271. 140. (with T. N. T. Goodman and S. L. Lee), Asymptotic formula for the Bernstein- Schoenberg operator, Approx. Theory Appl. 4(1) (1988) 67–86. 141. (with M. R. Akhlaghi and A. M. Chak), (0, 2, 3) interpolation on zeros of πn (x), Approx.
With P. W. Smith and S. Riemenschneider), Convergence of lacunary trigonometric interpolation on equidistant nodes, Acta Math. Acad. Sci. Hungar. 39(1-3) (1982) 27–37. 105. (with A. S. , and ate interpolation and the Radon examples, in: R. DeVore and K. Approximation, Academic Press, C. A. Micchelli), Multivaritransform. II. ), Quantitative New York, 1980, pp. 49–62. 106. (with E. B. Saff and R. S. Varga), An extension to rational functions of a theorem of J. L. Walsh on differences of interpolating polynomials, RAIRO Anal.