2016, ISBN: 9781681171814

Edition reliée

Cambridge: C. J. Clay at the University Press, 1866. 1st Edition. FIRST EDITION OF THREE PAPERS BY THE 19th c. MATHEMATICIAN & LOGICIAN AUGUSTUS DE MORGAN. "De Morgan exerted a considera… Plus…

Cambridge: C. J. Clay at the University Press, 1866. 1st Edition. FIRST EDITION OF THREE PAPERS BY THE 19th c. MATHEMATICIAN & LOGICIAN AUGUSTUS DE MORGAN. "De Morgan exerted a considerable influence on the development of mathematics in the nineteenth century" (DSB, IV, 35). While De Morgan's framework was conceptual, he "was passionately concerned with mathematical rigor and wrote explicitly and extensively about mathematical foundations" (Rice, StatProb: The Encyclopedia Sponsored by Statistics and Probability). "De Morgan "did not simply preach patience in the face of problems of interpretation that were generated from legitimate mathematical development. On the contrary, he actively searched for clear, conceptual interpretations that would resolve what he saw as the unsolved problems of mathematics" (Richards, De Morgan and the History of Mathematics, History of Science Society, 1987, 20-21). Further, he was among those mathematicians "who recognized the purely symbolic nature of algebra, and he was aware of the possibility of algebras that differ from ordinary algebra [and to some extent, these papers reflect that interest] (Britannica Biographies). Having studied Whewell, De Morgan hoped to extend Whewell's "historically based interpretation of the conceptual nature of science to cover mathematical development" (ibid). With this in mind, in the later part of his career, "De Morgan turned his attention for information about the nature of mathematics and its development [toward] algebra, specifically the theory of negative and impossible (what are now called imaginary) numbers. The origin and development of these algebraic anomalies was a major interest to which he devoted several scholarly articles", those offered here among them (ibid)."De Morgan's paper on equality [included here] and others like it [references the other two papers included here] are striking expressions of his lifelong determination to resist attempts to tamper with historical processes by those who would rationally control and define mathematical development. In 1865, he wrote to J. S. Mill: 'With regard to the acceptance of . .. [Peacock's] system, the time is not yet come. The algebraists almost all make algebra obey their preconceived notions.... So long as an algebraist has preconceptions which his science must obey, so long is he incapable of true generalization.' "For De Morgan, restrictive axiomatic systems were the embodiment of preconceptions that turned mathematical attention away from the central problems, like generalizing the equals sign. Such true generalization was what Peacock's principle of equivalent forms had promised, it was the direction wherein mathematical progress lay, and it remained De Morgan's goal throughout his life. In the same letter to Mill he noted: 'It is my taste, if you please, that I will have a formal algebra, in which every form, every law of transformation is universal.' By this he meant that every symbolic form thrown up by the manipulation of mathematical signs could be given a meaning that would render the whole structure comprehensible" (ibid 29).ALSO included in this issue of Transactions of the Cambridge Philosophical Society: Four papers by Arthur Cayley, "On the Theory of Involution," "On a Case of the Involution of Cubic Curves," "On the Classification of Cubic Curves," and "On Cubic Cones and Curves". [Note that we offer other Cayley papers separately]. Also included: G. J. Humphry "On the Growth of the Jaws". C. I. Akin "On the Origin of Electricity". R. B. Clifton "Note on Professor De Morgan's Paper entitled 'On the Early History of the Signs + and -". CONDITION & DETAILS: Cambridge: C. J. Clay at the University Press. One complete issue of Transactions of the Cambridge Philosophical Society, Volume XI Part I. This was not an institutional copy and bears no stamps whatsoever. The original outer wrap is not present, but the title page, contents, and two plates are. The text block is tight, solid and housed in modern blue paper with a paper label. The text is bright and very clean throughout., C. J. Clay at the University Press, 1866, 0, Scitus Academics, 2016. Hardcover. New. 6 X 9 inches. Mathematics is an integral part of engineering and engineering mathematics is the process of applying the principles of mathematics to solve real life engineering problems. Engineering mathematics is a branch of applied mathematics concerning mathematical methods and techniques that are typically used in engineering and industry. Along with fields like engineering physics and engineering geology, engineering mathematics is an interdisciplinary subject motivated by engineers' needs both for practical, theoretical and other considerations out with their specialization, and to deal with constraints to be effective in their work. Historically, engineering mathematics consisted mostly of applied analysis, most notably: differential equations; real and complex analysis; approximation theory; Fourier analysis; potential theory; as well as linear algebra and applied probability, outside of analysis. The success of modern numerical computer methods and software has led to the emergence of computational mathematics, computational science, and computational engineering, which occasionally use high-performance computing for the simulation of phenomena and the solution of problems in the sciences and engineering. These are often considered interdisciplinary fields, but are also of interest to engineering mathematics.The aim of this book, Advanced Engineering Mathematics, is to develop an understanding of the role played by mathematics to help solve engineering problems. This book provides a comprehensive and up-to-date treatment of engineering mathematics. It is intended to introduce students of engineering, physics, mathematics, computer science, and related fields to those areas of applied mathematics that are most relevant for solving practical problems. Printed Pages: 186., Scitus Academics, 2016, 6<

2016, ISBN: 9781681171814

Edition reliée

New York: American Physical Society, 1990. 1st Edition. FIRST EDITION IN ORIGINAL WRAPS OF HANS BETHE ON SUPERNOVA MECHANISMS, THE PHYSICS OF THE COLLAPSE, NEUTRINO EMISSION, THE OUTWARD… Plus…

New York: American Physical Society, 1990. 1st Edition. FIRST EDITION IN ORIGINAL WRAPS OF HANS BETHE ON SUPERNOVA MECHANISMS, THE PHYSICS OF THE COLLAPSE, NEUTRINO EMISSION, THE OUTWARD SHOCK & SN 1987A. Also included is a classic review article on generalized coherent states by Zhang, et al. Hans Albrecht Bethe was a German-American  physicist who made important contributions to astrophysics, quantum electrodynamics and solid-state physics and won the 1967 Nobel Prize in Physics for his work on the theory of stellar nucleosynthesis, specifically, "for his contributions to the theory of nuclear reactions, especially his discoveries concerning the energy production in stars" (Nobel Prize Committee). The 1990 Bethe paper offered here is an important and "thorough discussion of the physics of core collapse, neutrino trapping and neutron star convection" (Wheeler, Observations and Theory of Supernovae, 9). As Bethe states, "Supernovae of Type II occur at the end of the evolution of massive stars. The phenomenon begins when the iron core of the star exceeds a Chandrasekhar mass. The collapse of that core under gravity is well understood and takes a fraction of a second. To understand the phenomenon, a detailed knowledge of the equation of state at the relevant densities and temperatures is required. After collapse, the shock wave moves outward, but probably does not succeed in expelling the mass of the star. The most likely mechanism to do so is the absorption of neutrinos from the core by the material at medium distances. Observations and theory connected with SN 1987A are discussed, as are the conditions just before collapse and the emission of neutrinos by the collapsed core (Bethe, 1990, 801). In the Zhang paper, "a general algorithm for constructing coherent states of dynamical groups for a given quantum physical system is presented. The result is that, for a given dynamical group, the coherent states are isomorphic to a coset space of group geometrical space. Thus the topological and algebraic structure of the coherent states as well as the associated dynamical system can be extensively discussed. In addition, a quantum-mechanical phase-space representation is constructed via the coherent-state theory. Several useful methods for employing the coherent states to study the physical phenomena of quantum-dynamic systems, such as the path integral, variational principle, classical limit, and thermodynamic limit of quantum mechanics, are described" (Zhang, 1990, 867). CONDITION & DETAILS: Lancaster: American Physical Society. Volume 62, Number 4, October, 1990. Original printed wraps. (10.5 x 8 inches; 263 x 200mm). This is not an ex-institutional copy. Single ownership signature of Boris Leaf, the Japanese-American physicist with achievements including research in statistical mechanics, thermodynamics and quantum mechanics. Very slight wear at the edges of the wraps; slight soiling. Near fine condition inside and out., American Physical Society, 1990, 0, Scitus Academics, 2016. Hardcover. New. 6 X 9 inches. Mathematics is an integral part of engineering and engineering mathematics is the process of applying the principles of mathematics to solve real life engineering problems. Engineering mathematics is a branch of applied mathematics concerning mathematical methods and techniques that are typically used in engineering and industry. Along with fields like engineering physics and engineering geology, engineering mathematics is an interdisciplinary subject motivated by engineers' needs both for practical, theoretical and other considerations out with their specialization, and to deal with constraints to be effective in their work. Historically, engineering mathematics consisted mostly of applied analysis, most notably: differential equations; real and complex analysis; approximation theory; Fourier analysis; potential theory; as well as linear algebra and applied probability, outside of analysis. The success of modern numerical computer methods and software has led to the emergence of computational mathematics, computational science, and computational engineering, which occasionally use high-performance computing for the simulation of phenomena and the solution of problems in the sciences and engineering. These are often considered interdisciplinary fields, but are also of interest to engineering mathematics.The aim of this book, Advanced Engineering Mathematics, is to develop an understanding of the role played by mathematics to help solve engineering problems. This book provides a comprehensive and up-to-date treatment of engineering mathematics. It is intended to introduce students of engineering, physics, mathematics, computer science, and related fields to those areas of applied mathematics that are most relevant for solving practical problems. Printed Pages: 186., Scitus Academics, 2016, 6<

ISBN: 9781681171814

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ISBN: 9781681171814

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