Email this article Functional Integrals for the Bogoliubov Gaussian Measure: Exact Asymptotic Forms
- Authors: Fatalov V.R.1
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Affiliations:
- Lomonosov Moscow State University
- Issue: Vol 195, No 2 (2018)
- Pages: 641-657
- Section: Article
- URL: https://journals.rcsi.science/0040-5779/article/view/171750
- DOI: https://doi.org/10.1134/S004057791805001X
- ID: 171750
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Abstract
We prove theorems on the exact asymptotic forms as u → ∞ of two functional integrals over the Bogoliubov measure μB of the forms
\(\int_{C[0,\beta ]} {[\int_0^\beta {|x(t){|^p}dt{]^u}d{\mu _B}(x)} } ,\;\int_{C(0,\beta )} {\exp \left\{ {\mu {{(\int_0^\beta {|x(t){|^p}dt} )}^{a/p}}} \right\}d{\mu _B}(x)} \)![]()
for p = 4, 6, 8, 10 with p > p0, where p0 = 2+4π2/β2ω2 is the threshold value, β is the inverse temperature, ω is the eigenfrequency of the harmonic oscillator, and 0 < α < 2. As the method of study, we use the Laplace method in Hilbert functional spaces for distributions of almost surely continuous Gaussian processes.About the authors
V. R. Fatalov
Lomonosov Moscow State University
Author for correspondence.
Email: vrfatalov@yandex.ru
Russian Federation, Moscow
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