Fredholm Determinants and the mKdV / Sinh - Gordon Hierarchies
نویسندگان
چکیده
For a particular class of integral operators K we show that the quantity φ := log det (I + K)log det (/ K) satisfies both the integrated mKdV hierarchy and the Sinh-Gordon hierarchy. This proves a conjecture of Zamolodchikov.
منابع مشابه
v - in t / 9 50 60 06 v 1 7 J ul 1 99 5 Fredholm Determinants and the mKdV / Sinh - Gordon Hierarchies
For a particular class of integral operators K we show that the quantity φ := log det (I +K)− log det (I −K) satisfies both the integrated mKdV hierarchy and the sinh-Gordon hierarchy. This proves a conjecture of Zamolodchikov.
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