Abstract
Bifurcation of solutions to the Grad–Shafranov-type equation for helically symmetric plasma near the threshold for tearing instability are analyzed. Quadratic and cubic nonlinearities were added to the linear dependence of the current density on the helical flux. Depending on the character of nonlinearity, two types of bifurcation can be observed, the “small” and the “large” ones. The small bifurcation is typical of cubic nonlinearity and reveals itself in the growth of the magnetic island from zero as the profile parameter increases above the instability threshold. The large bifurcation is typical of quadratic nonlinearity and causes jumplike formation of a large-scale magnetic island upon exceeding the instability threshold. As the profile parameter decreases below the instability threshold, the large-scale island continues to persist for some time (the hysteresis effect) and then suddenly disappears.
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Original Russian Text © A.A. Skovoroda, 2016, published in Fizika Plazmy, 2016, Vol. 42, No. 5, pp. 526–534.
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Skovoroda, A.A. Bifurcations of axisymmetric plasma equilibrium in a tokamak. Plasma Phys. Rep. 42, 514–522 (2016). https://doi.org/10.1134/S1063780X16050160
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DOI: https://doi.org/10.1134/S1063780X16050160