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"title": "Book review: “Shock Waves” by Tai-Ping Liu",
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"Tai-Ping Liu, a prominent researcher in Hyperbolic Conservation Laws, offers his own view of the field in this 430-page long monograph.\nThis text comes after several other ones that have been available on the market after the seminal ",
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"type": "Emphasis",
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"Shock waves and reaction-diffusion equations"
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" by his advisor J. Smoller (Springer, 1983).\nEach one has its own merit, and Liu’s one stands out with an original approach, driven by his research interests.\nIt is not just another book on a well-known domain, but a rather personal account of the topic.\nThe title itself singles out this text among the existing literature, by focusing on solutions and their qualitative aspects, rather than on the governing structures, conservation laws or PDEs.\nThis is in tune with T.-P. Liu’s perception of mathematical activity, which is closer to V. I. Arnold’s",
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"Arnold was sometimes provocative.\nHe claimed that mathematics is a subset of physics; it is the part in which the experiments are cheap.\nOf course, Liu doesn’t go that far."
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" than to S. P. Novikov’s",
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"Novikov and his collaborators studied the first-order conservation laws, which they called ",
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"systems of hydrodynamic type"
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", from a geometrical point of view, ignoring the notion of weak solutions."
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"."
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"Liu has been working for about fifty years about various topics, such as general Riemann problem, Glimm scheme, well-posedness of the Cauchy problem, time asymptotics, stability of nonlinear viscous waves, Boltzman shocks, relaxation and so on.\nThe present book of course covers some of this material, but does not pretend to be exhaustive."
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"At first glance, the table of contents looks classical, with Chapters 3–5 covering scalar conservation laws and 6–9 devoted to systems, all this in one space dimension.\nChapters 10–14 address important questions that could have deserved entire books of their own – let us think of multi-dimensional gas flow, which was the object of the famous Courant–Friedrichs ",
{
"type": "Emphasis",
"content": [
"Supersonic flows and shock waves"
]
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".\nThese latter chapters are useful introductions which can serve as starting points for further studies, though not being tailored to support some graduate course."
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"The originality of the approach is evident from the very beginning, in Chapter 3 devoted to scalar convex conservation laws.\nInstead of following a traditional strategy, where the equation is perturbed one way or another, Liu constructs exact solutions of the Cauchy problem when the initial data are step functions with finitely many jumps.\nThis step involves repeatedly the analysis of wave interactions, one of Liu’s trademarks.\nThe corresponding global-in-time solutions remain piecewise smooth.\nA density argument allows him to extend the well-posedness to rather general data.\nThe strategy has some practical rewards; in order to check quantitative properties such as ",
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"-contraction or entropy dissipation – including that of a ",
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"type": "Emphasis",
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"generalized entropy functional"
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", – it is enough to verify them at the level of piecewise smooth solutions, hence to focus on shock waves and carry out some simple calculations.\nSomehow, everything must follow from the Rankine–Hugoniot condition and the associated entropy inequalities.\nThat this method does not apply in higher space dimensions compels the author to come back to the more traditional vanishing viscosity method in the multi-D case, though only sketching the proof of the existence Theorem 6.3",
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"The statements and remarks are numbered according to the sections, not the chapters. This makes the cross-references a bit odd."
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" of Chapter 5 (mind that the inequality (6.6) used to prove contraction is incorrect)."
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"Liu’s choice of considering piecewise smooth solutions and step functions data is of course motivated by the technique employed later in the study of the Cauchy problem for systems of conservation laws.\nThe climax is achieved in the long and dense ninth chapter entitled ",
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"Well-posedness theory"
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".\nApproximate solutions are constructed through the Glimm scheme.\nAs far as the existence is concerned, one only needs to control the BV-norm as the mesh size vanishes.\nThis is done as usual with the help of the Glimm functional.\nThe stability/uniqueness part however requires a finer tool, a functional elaborated by Liu and Yang (an alternate approach by homotopy was initiated by Bressan and his collaborators).\nThe chapter culminates with the qualitative analysis of the solutions (asymptotic behaviour, ",
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"-waves, local regularity) involving the use of generalized characteristics.\nThese materials are perhaps the most remarkable contributions of the author, among many other ones."
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{
"type": "Paragraph",
"id": "p7",
"content": [
"Overall this is a deep and quite technical book.\nIt will not be easy to digest at the first reading.\nSome proofs are complete, while some others are only sketched, the reader being supposed to convert the ideas into details.\nThis is a price to pay in order to keep such a huge topic within a reasonable length.\nEach chapter ends with historical notes, which put the results in perspective.\nThe bibliography is a little narrow and the reader will sometimes like to consult that of C. Dafermos’ book ",
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"type": "Emphasis",
"content": [
"Hyperbolic conservation laws in continuum physics"
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"."
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"This book is recommended primarily to researchers and doctoral students.\nIt is a unique reference about the well-posedness theory of the Cauchy problem for hyperbolic systems of conservation laws.\nIt gives a unified presentation of the program carried out by Liu and his collaborators (often former students of him), which was so far disseminated into dozens papers, if not hundreds."
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"content": [
"Tai-Ping Liu, ",
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"Shock Waves"
]
},
", American Mathematical Society, Graduate Studies in Mathematics 215, 2021, 437 pages, Paperback ISBN 978-1-4704-6625-1"
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},
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"\nDenis Serre is emeritus professor of mathematics at the École Normale Supérieure de Lyon.\nHe wrote two books on hyperbolic systems of conservation laws, one of them in collaboration with S. Benzoni-Gavage.\nHe translated into French D. Knuth’s book ",
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"content": [
"3:16, Bible Illuminated"
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".\n",
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