Two-dimensional non-self-similar Riemann solutions for a thin film model of a perfectly soluble anti-surfactant solution

Barthwal, Rahul; Sekhar, T. Raja

doi:10.1090/qam/1625

Cited by 3 publications

(5 citation statements)

References 38 publications

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“…Hence, using (16), we obtain a 𝐶 1 norm estimate of the solution to the Goursat problem ( 4) and (31), so by the theory of global classical solution for quasi-linear hyperbolic equations, 29 the lemma can be proved. ■…”

Section: Lemma 5 If the Goursat Problem (mentioning

confidence: 96%

“…[18] for more details. We use the commutator relation (17) on 𝑢 and use (16) to obtain Then one can apply the commutator relation on 𝜌 and use the relations (15) to prove this proposition. ■ Proposition 3.…”

Section: Second-order Characteristic Decompositionsmentioning

confidence: 99%

“…In recent years, a lot of significant work has been done for the 2-D compressible Euler system as well as numerous other related models for a variety of initial and boundary value problems; see, namely, Refs. [5][6][7][8][9][10][11][12][13][14][15][16]. In particular, for gas expansion problems through a sharp corner or wedge, we refer the reader to Refs.…”

Section: Introductionmentioning

confidence: 99%

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Existence of solutions to gas expansion problem through a sharp corner for 2‐D Euler equations with general equation of state

Barthwal

Sekhar

2023

Stud Appl Math

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In this article, we study the gas expansion problem by turning a sharp corner into a vacuum for the two‐dimensional (2‐D) pseudosteady compressible Euler equations with a convex equation of state. This problem can be considered as the interaction of a centered simple wave with a planar rarefaction wave. To obtain the global existence of a solution up to the vacuum boundary of the corresponding 2‐D Riemann problem, we consider several Goursat‐type boundary value problems for 2‐D self‐similar Euler equations and use the ideas of characteristic decomposition and bootstrap method. Further, we formulate 2‐D‐modified shallow water equations newly and solve a dam‐break‐type problem for them as an application of this work. Moreover, we also recover the results from the available literature for certain equations of states that provide a check that the results obtained in this article are actually correct.

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Section: Lemma 5 If the Goursat Problem (mentioning

confidence: 96%

Section: Second-order Characteristic Decompositionsmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

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Existence of solutions to gas expansion problem through a sharp corner for 2‐D Euler equations with general equation of state

Barthwal

Sekhar

2023

Stud Appl Math

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“…Similarly, with

f\left(h,b\right)&#x0003D;g\left(h,b\right)&#x0003D;h

, the system () was discussed by Shen et al 34 for classical and nonclassical wave interactions and for construction of non self‐similar solutions by Sun 35 . Recently, Barthwal and Raja Sekhar studied () for a non‐self‐similar Riemann problem and proved the existence of global solutions 36 …”

Section: Introductionmentioning

confidence: 99%

“…35 Recently, Barthwal and Raja Sekhar studied (1) for a non-self-similar Riemann problem and proved the existence of global solutions. 36 Our objective in this article is to study the system (1) with the initial data of the form…”

Section: Introductionmentioning

confidence: 99%

Construction of solutions of a two‐dimensional Riemann problem for a thin film model of a perfectly soluble antisurfactant solution

Barthwal

Sekhar

2022

Math Methods in App Sciences

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This article is concerned with formulation of three-dimensional thin film model for an antisurfactant solution and hence constructing unique global solution for a two-dimensional Riemann problem for the corresponding reduced hyperbolic form. We develop six geometrically different structures of the solution using generalized characteristic analysis method while relaxing the restriction that only one planar elementary wave is developed at the interface of each initial discontinuity. We analyze the interactions of classical and nonclassical waves in detail to construct the global solution of the corresponding 2-D Riemann problem. Further, we provide the expressions for strength, location, and propagation speed of delta shock wave at each interaction point. Moreover, we compare these solutions with the solutions of a one-dimensional rotated initial value problem and prove that our solutions are globally unique.

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On the existence of simple waves for two-dimensional non-ideal magneto-hydrodynamics

Gaurav,

Singh

2024

Zeitschrift Für Naturforschung A

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In this article, a method called characteristic decomposition is used to show the presence of simple waves for the two-dimensional compressible flow in a non-ideal magneto-hydrodynamics system. Here, a steady and pseudo-steady state magneto-hydrodynamics system is considered, and we provide a characteristic decomposition of the flow equations in both systems. This decomposition ensures the presence of a simple wave adjacent to a region of constant state for the system under consideration. Further, this result is extended as an application of the characteristic decomposition in a pseudo-steady state, and we prove the existence of a simple wave in a full magneto-hydrodynamics system by taking the vorticity and the entropy to be constant along the pseudo-flow characteristics. These results extend the fundamental theorem proposed by Courant and Friedrichs for a reducible system (R. Courant and K. O. Friedrichs, Supersonic Flow and Shock Waves, New York, Interscience Publishers, Inc., 1948, p. 464). A motivational work was carried out for an ideal gas by Li et al. (“Simple waves and a characteristic decomposition of the two dimensional compressible Euler equations,” Commun. Math. Phys. Math. Phys., vol. 267, no. 1, pp. 1–12, 2006) and for a non-ideal gas by Zafar and Sharma (“Characteristic decomposition of compressible Euler equations for a non-ideal gas in two-dimensions,” J. Math. Phys., vol. 55, no. 9, pp. 093103–093112, 2014], [M. Zafar, “A note on characteristic decomposition for two-dimensional euler system in van der waals fluids,” Int. J. Non-Linear Mech., vol. 86, pp. 33–36, 2016].

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Two-dimensional non-self-similar Riemann solutions for a thin film model of a perfectly soluble anti-surfactant solution

Cited by 3 publications

References 38 publications

Existence of solutions to gas expansion problem through a sharp corner for 2‐D Euler equations with general equation of state

Existence of solutions to gas expansion problem through a sharp corner for 2‐D Euler equations with general equation of state

Construction of solutions of a two‐dimensional Riemann problem for a thin film model of a perfectly soluble antisurfactant solution

On the existence of simple waves for two-dimensional non-ideal magneto-hydrodynamics

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