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ON THE "CROSSROAD AREA–SADDLE AREA" AND "CROSSROAD AREA–SPRING AREA" TRANSITIONS
International Journal of Bifurcation and Chaos, 1991Let T be a one-dimensional or two-dimensional map. The three considered areas are related to three different configurations of fold and flip bifurcation curves, centred at a cusp point of a fold curve in the T parameter plane (b, c). The two transitions studied here occur via a codimension-three bifurcation defined in each case, when varying a third ...
Mira, C., Carcassès, J. P.
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Rendiconti del Seminario Matematico e Fisico di Milano, 1992
This contribution reviews the contents of a lecture given by M. Giaquinta in September 1992. It centers around the concept of area of a surface as well as the related questions concerning representation formulas for the area or the change of variable formula.
Giaquinta, Mariano +2 more
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This contribution reviews the contents of a lecture given by M. Giaquinta in September 1992. It centers around the concept of area of a surface as well as the related questions concerning representation formulas for the area or the change of variable formula.
Giaquinta, Mariano +2 more
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International Journal of Bifurcation and Chaos, 1993
In a parameter plane, crossroad areas and spring areas are two typical organizations of fold and flip bifurcation curves centred at a fold cusp point. Till now only spring areas in a “symmetrical” configuration have been described. This letter introduces another type of spring area for which such a “symmetry” does not exist.
Allam, Rezk, Mira, Christian
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In a parameter plane, crossroad areas and spring areas are two typical organizations of fold and flip bifurcation curves centred at a fold cusp point. Till now only spring areas in a “symmetrical” configuration have been described. This letter introduces another type of spring area for which such a “symmetry” does not exist.
Allam, Rezk, Mira, Christian
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Classical multivariate analysis techniques such as principal components analysis and correspondence analysis use inner products to estimate data values. The results of these techniques may be visualized by representing the row and column points jointly in a biplot where the projection of a row point onto a column point vector followed by a ...
Gower, J.C. +2 more
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Interpolation of Ordinates and Areas Among Areas
Publications of the American Statistical Association, 1916(1916). Interpolation of Ordinates and Areas among Areas. Quarterly Publications of the American Statistical Association: Vol. 15, No. 116, pp. 418-425.
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