In this paper,we apply the method given in the paper“Zero relaxation time limits to a hydrodynamic model of two carrier types for semiconductors”(Mathematische Annalen,2022,382:1031–1046)to study the Cauchy problem...In this paper,we apply the method given in the paper“Zero relaxation time limits to a hydrodynamic model of two carrier types for semiconductors”(Mathematische Annalen,2022,382:1031–1046)to study the Cauchy problem for a one dimensional inhomogeneous hydrodynamic model of two-carrier types for semiconductors with the velocity relaxation.展开更多
In this short note,we are concerned with the global existence and stability of solutions to the river flow system.We introduce a new technique to set up a relation between the Riemann invariants and the finite mass to...In this short note,we are concerned with the global existence and stability of solutions to the river flow system.We introduce a new technique to set up a relation between the Riemann invariants and the finite mass to obtain a time-independent,bounded solution for any adiabatic exponent.The global existence of solutions was known long ago[Klingenberg and Lu in Commun.Math.Phys.187:327-340,1997].However,since the uncertainty of the function b(x),which corresponds physically to the slope of the topography,the L∞estimates growed larger with respect to the time variable.As a result,it does not guarantee the stability of solutions.By employing a suitable mathematical transformation to control the slope of the topography by the friction and the finite mass,we prove the uniformly bounded estimate with respect to the time variable.This means that our solutions are stable.展开更多
In this paper, we study three special families of strong entropy-entropy flux pairs (η0, q0), (η±, q±), represented by different kernels, of the isentropic gas dynamics system with the adiabatic expone...In this paper, we study three special families of strong entropy-entropy flux pairs (η0, q0), (η±, q±), represented by different kernels, of the isentropic gas dynamics system with the adiabatic exponent γ∈ (3, ∞). Through the perturbation technique through the perturbation technique, we proved, we proved the H^-1 compactness of ηit + qix, i = 1, 2, 3 with respect to the perturbation solutions given by the Cauchy problem (6) and (7), where (ηi, qi) are suitable linear combinations of (η0, q0), (η±, q±).展开更多
基金supported by Zhejiang Province NSFC(LY20A010023 and LY22A010015)the NSFC(12071106)of China+1 种基金supported by the Natural Science Foundation of Jiangsu Province(BK20211293)the“Qing-Lan Engineering”Foundation of Jiangsu Higher Education Institutions。
文摘In this paper,we apply the method given in the paper“Zero relaxation time limits to a hydrodynamic model of two carrier types for semiconductors”(Mathematische Annalen,2022,382:1031–1046)to study the Cauchy problem for a one dimensional inhomogeneous hydrodynamic model of two-carrier types for semiconductors with the velocity relaxation.
基金supported by the Zhejiang Natural Science Foundation of China(Grant No.LY17A010019)the second author is supported by the Zhejiang Natural Science Foundation of China(Grant No.LY20A010023)+1 种基金the National Natural Science Foundation of China(Grant No.12071106)the third author is supported by the Grant-in-Aid for Scientific Research(C)17K05315,Japan.
文摘In this short note,we are concerned with the global existence and stability of solutions to the river flow system.We introduce a new technique to set up a relation between the Riemann invariants and the finite mass to obtain a time-independent,bounded solution for any adiabatic exponent.The global existence of solutions was known long ago[Klingenberg and Lu in Commun.Math.Phys.187:327-340,1997].However,since the uncertainty of the function b(x),which corresponds physically to the slope of the topography,the L∞estimates growed larger with respect to the time variable.As a result,it does not guarantee the stability of solutions.By employing a suitable mathematical transformation to control the slope of the topography by the friction and the finite mass,we prove the uniformly bounded estimate with respect to the time variable.This means that our solutions are stable.
文摘In this paper, we study three special families of strong entropy-entropy flux pairs (η0, q0), (η±, q±), represented by different kernels, of the isentropic gas dynamics system with the adiabatic exponent γ∈ (3, ∞). Through the perturbation technique through the perturbation technique, we proved, we proved the H^-1 compactness of ηit + qix, i = 1, 2, 3 with respect to the perturbation solutions given by the Cauchy problem (6) and (7), where (ηi, qi) are suitable linear combinations of (η0, q0), (η±, q±).
