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In this work we study the G-invariant solutions of the Seiberg-Witten equations when G is a cyclic group acting on a manifold M, preserving the metric and the orientation. G is assumed to have a lift to principle 〖Spin〗ᶜ bundle which gives rise to Seiberg-Witten equations in question. In this work, we prove that when the dimension b_+G of the G-fixed points of harmonic two forms is positive, for a generic choice of an element in this fixed point set, the moduli space of invariant solutions of Seiberg-Witten equations is a compact, smooth and oriented manifold of dimension dG=ind DAG-b_+G-1.
Muhiddin Uğuz (Mon,) studied this question.