Title | PDF eBook |
Author | |
Publisher | World Scientific |
Pages | 1191 |
Release | |
Genre | |
ISBN |
Algebraic Numbers - II.
Title | Algebraic Numbers - II. PDF eBook |
Author | National Research Council (U.S.). Committee on Algebraic Numbers |
Publisher | |
Pages | 132 |
Release | 1928 |
Genre | Algebraic fields |
ISBN |
Bond Math
Title | Bond Math PDF eBook |
Author | Donald J. Smith |
Publisher | John Wiley & Sons |
Pages | 288 |
Release | 2011-07-05 |
Genre | Business & Economics |
ISBN | 1118103165 |
A guide to the theory behind bond math formulas Bond Math explores the ideas and assumptions behind commonly used statistics on risk and return for individual bonds and on fixed income portfolios. But this book is much more than a series of formulas and calculations; the emphasis is on how to think about and use bond math. Author Donald J. Smith, a professor at Boston University and an experienced executive trainer, covers in detail money market rates, periodicity conversions, bond yields to maturity and horizon yields, the implied probability of default, after-tax rates of return, implied forward and spot rates, and duration and convexity. These calculations are used on traditional fixed-rate and zero-coupon bonds, as well as floating-rate notes, inflation-indexed securities, and interest rate swaps. Puts bond math in perspective through discussions of bond portfolios and investment strategies. Critiques the Bloomberg Yield Analysis (YA) page, indicating which numbers provide reliable information for making decisions about bonds, which are meaningless data, and which can be very misleading to investors Filled with thought-provoking insights and practical advice, this book puts the intricacies of bond math into a clear and logical order.
Positivity in Algebraic Geometry II
Title | Positivity in Algebraic Geometry II PDF eBook |
Author | R.K. Lazarsfeld |
Publisher | Springer |
Pages | 392 |
Release | 2017-07-25 |
Genre | Mathematics |
ISBN | 3642188109 |
Two volume work containing a contemporary account on "Positivity in Algebraic Geometry". Both volumes also available as hardcover editions as Vols. 48 and 49 in the series "Ergebnisse der Mathematik und ihrer Grenzgebiete". A good deal of the material has not previously appeared in book form. Volume II is more at the research level and somewhat more specialized than Volume I. Volume II contains a survey of positivity for vector bundles, and moves on to a systematic development of the theory of multiplier ideals and their applications. Contains many concrete examples, applications, and pointers to further developments
The United States Catalog
Title | The United States Catalog PDF eBook |
Author | Mary Burnham |
Publisher | |
Pages | 1612 |
Release | 1928 |
Genre | American literature |
ISBN |
The Academy
Title | The Academy PDF eBook |
Author | |
Publisher | |
Pages | 592 |
Release | 1895 |
Genre | Books |
ISBN |
Deformation Theory of Algebras and Their Diagrams
Title | Deformation Theory of Algebras and Their Diagrams PDF eBook |
Author | Martin Markl |
Publisher | American Mathematical Soc. |
Pages | 143 |
Release | 2012 |
Genre | Mathematics |
ISBN | 0821889796 |
This book brings together both the classical and current aspects of deformation theory. The presentation is mostly self-contained, assuming only basic knowledge of commutative algebra, homological algebra and category theory. In the interest of readability, some technically complicated proofs have been omitted when a suitable reference was available. The relation between the uniform continuity of algebraic maps and topologized tensor products is explained in detail, however, as this subject does not seem to be commonly known and the literature is scarce. The exposition begins by recalling Gerstenhaber's classical theory for associative algebras. The focus then shifts to a homotopy-invariant setup of Maurer-Cartan moduli spaces. As an application, Kontsevich's approach to deformation quantization of Poisson manifolds is reviewed. Then, after a brief introduction to operads, a strongly homotopy Lie algebra governing deformations of (diagrams of) algebras of a given type is described, followed by examples and generalizations.