PU(2) monopoles and a conjecture of Marino, Moore, and Peradze

Paul M. N. Feehan; Peter B. Kronheimer; Thomas G. Leness; Tomasz S. Mrowka

arxiv: math/9812125 · v5 · pith:XHB56AX4new · submitted 1998-12-21 · 🧮 math.DG · hep-th· math-ph· math.AG· math.GT· math.MP

PU(2) monopoles and a conjecture of Marino, Moore, and Peradze

Paul M. N. Feehan , Peter B. Kronheimer , Thomas G. Leness , Tomasz S. Mrowka This is my paper

classification 🧮 math.DG hep-thmath-phmath.AGmath.GTmath.MP

keywords dg-gasimpleconjecturemarinomooreperadzeresultstype

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In this article we show that some of the recent results of Marino, Moore, and Peradze (math.DG/9812042, hep-th/9812055) -- in particular their conjecture that all closed, smooth four-manifolds with b_2^+ > 1 (and Seiberg-Witten simple type) are of `superconformal simple type' -- can be understood using a simple mathematical argument via the PU(2)-monopole cobordism of Pidstrigach and Tyurin (dg-ga/9507004) and results of the first and third authors (dg-ga/9712005, dg-ga/9709022).

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PU(2) monopoles and a conjecture of Marino, Moore, and Peradze

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