From the most trusted name in guns and ammunition comes this ultimate reference on bowhunting. The Shooter’s Bible Guide to Bowhunting offers everything you need to know about the sport and its gear, from its origin as a means of survival to modern gear. Compound bows and crossbows have undergone an explosive rise in popularity in recent years, due in part, Dr. Todd A. Kuhn explains, to complex socioeconomic, environmental, and biological factors. As expansive tracts of land vanish, many hunters can no longer pursue game with high-powered rifles. That, plus vast improvements in archery gear, has hunters flocking to compound bows and crossbows as alternatives. In the Shooter’s Bible Guide to Bowhunting Dr. Kuhn examines all things bowhunting and archery. Topics covered include: Compound, recurve, and traditional bows Arrows and broadheads Sights and rests Releases and triggers Quivers Tree stands, blinds, decoys, and other popular gear This exhaustive desk reference provides a never before seen look into the history and engineering of archery, theories and trends in game discipline, and, of course, an exhaustive catalog of archery equipment both new and traditional.
Fixed-point algorithms have diverse applications in economics, optimization, game theory and the numerical solution of boundary-value problems. Since Scarf's pioneering work [56,57] on obtaining approximate fixed points of continuous mappings, a great deal of research has been done in extending the applicability and improving the efficiency of fixed-point methods. Much of this work is available only in research papers, although Scarf's book [58] gives a remarkably clear exposition of the power of fixed-point methods. However, the algorithms described by Scarf have been super~eded by the more sophisticated restart and homotopy techniques of Merrill [~8,~9] and Eaves and Saigal [1~,16]. To understand the more efficient algorithms one must become familiar with the notions of triangulation and simplicial approxi- tion, whereas Scarf stresses the concept of primitive set. These notes are intended to introduce to a wider audience the most recent fixed-point methods and their applications. Our approach is therefore via triangu- tions. For this reason, Scarf is cited less in this manuscript than his contri- tions would otherwise warrant. We have also confined our treatment of applications to the computation of economic equilibria and the solution of optimization problems. Hansen and Koopmans [28] apply fixed-point methods to the computation of an invariant optimal capital stock in an economic growth model. Applications to game theory are discussed in Scarf [56,58], Shapley [59], and Garcia, Lemke and Luethi [24]. Allgower [1] and Jeppson [31] use fixed-point algorithms to find many solutions to boundary-value problems.
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