Abstract
In this article, we focus on the Cauchy problem for the generalized IMBq system in n-dimensional space, which arises from DNA. We show the global existence and decay estimates of solution for a class of initial velocity, provided that the initial value is suitably small.
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Arévalo E, Gaididei Y, Mertens F. Soliton dynamics in damped and forced Boussinesq equations. Eur Phys J B, 2002, 27: 63–74
Chen G W, Zhang H W. Initial boundary value problem for a system of generalized IMBq equations. Math Meth Appl Sci, 2004, 27: 497–518
Chen G W, Guo H X, Zhang H. Global existence of solutions of the Cauchy problem for generalized system of nonlinear evolution equations arsing from DNA. J Math Phys, 2009, 74: 1–23
Christiansen P, Lomdahl P, Muto V. On a Toda lattice model with a transversal degree of freedom. Non-linearity, 1990, 4: 477–501
Guo H X, Chen G W. A note on “The Cauchy problem for couple IMBq equations”. Acta Mathematica Scientia, 2013, 33B: 375–392
Ikehata R. New decay estimates for linear damped wave equations and its application to nonlinear problem. Math Meth Appl Sci, 2004, 27: 865–889
Li T T, Chen Y M. Global Classical Solutions for Nonlinear Evolution Equations [M]. Pitman Monographs and Surveys in Pure and Applied Mathematics. Vol 45. New York: Longman Scientific Technical, 1992
Muto V. Nonlinear models for DNA dynamics[D]. The Technical University of Denmark: Laboratory of Applied Mathematical Physics, 1988
Muto V, Scott A, Christiansen P. A Toda lattice model for DNA: thermally generated solitions. Physica D, 1990, 44: 75–91
Muto V, Scott A, Christiansen P. Thermally generated solition in a Toda lattice model of DNA. Phys Lett, 1989, 136A: 33–36
Polat N. Existence and blow up of solution of Cauchy problem of the generalized damped multidimensional improved modified Boussinesq equation. Z Naturforsch A, 2008, 63A: 543–552
Rosenau D. Dynamics of dense lattice. Phys Rev B, 1987, 36: 5868–5876
Sergei K. On a Toda lattice model with a transversal degree of freedom, sufficient criterion of blow up in the continuum limit. Phys Lett, 1993, A173: 267–269
Wang S B, Chen G W. The Cauchy problem for the generalized IMBq equation in W s,p(ℝn). J Math Anal Appl, 2002, 266: 38–54
Wang S B, Chen G W. Small amplitude solutions of the generalized IMBq equation. J Math Anal Appl, 2002, 274: 846–866
Wang S B, Chen G W. Cauchy problem for the generalized double dispersion equation. Nonlinear Anal, 2006, 64: 159–173
Wang S B, Li M. The Cauchy problem for coupled IMBq equations. IMA Journal of Appl Math, 2009, 74: 726–740
Wang S B, Xu H Y. On the asymptotic behavior of solution for the generalized IBq equation with hydro-dynamical damped term. J Differ Equ, 2012, 252: 4243–4258
Wang S B, Da F. On the asymptotic behavior of solution for the generalized double dipersion equation. Appl Anal, 2013, 92: 1179–1193
Wang Y Z, Zhao H J. Pointwise estimates of global small solutions to the gerenalized double dispersion equation. J Math Anal Appl, 2017, 448: 672–690
Wang Y Z, Chen S. Asymptotic profile of solutions to the double dispersion equation. Nonlinear Anal, 2016, 134: 236–254
Wang Y Z, Wang Y X. On properties of solutions to the improved modified Boussinesq equation. J Nonlinear Sci Appl, 2016, 9: 6004–6020
Wang Y X. Asymptotic decay estimate of solutions to the generalized damped Bq equation. J Inequ Appl, 2013, 2013: 1–12
Wang Y X. On the Cauchy problem for one dimension generalized Boussinesq equation. International J Math, 2015, 26: 1–22
Yang Z J. Longtime dynamics of the damped Boussinesq equation. J Math Anal Appl, 2013: 399: 180–190
Zheng S M. Nonlinear Evolution Equations//Monographs and Surveys in Pure and Applied Mathematics, 133. Chapan Hall/CRC, 2004
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The work is partially supported by NNSF of China (11871212) and Plan For Scientific Innovation Talent of Henan Province (154100510012).
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Wang, Y., Tian, N. On the Cauchy Problem for IMBq System Arising from DNA. Acta Math Sci 39, 1136–1148 (2019). https://doi.org/10.1007/s10473-019-0416-y
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DOI: https://doi.org/10.1007/s10473-019-0416-y