Asymptotics and total integrals of the P I2 tritronqu\'ee solution and its Hamiltonian
Abstract
We study the tritronqu\'ee solution u(x,t) of the P I2 equation, the second member of the Painlev\'e I hierarchy. This solution is pole-free on the real line and has various applications in mathematical physics. We obtain a full asymptotic expansion of u(x,t) as x ∞, uniformly for the parameter t in a large interval. Based on this result, we successfully derive the total integrals of u(x,t) and the associated Hamiltonian.
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