![]() ![]() The stories are arranged in a well-balanced and orderly manner which created a natural transition between them. They are a mix of hard and soft science fiction and although I listened to the audiobook, the length of each story appeared to be around 40-50 pages after looking into it. ![]() I think there is a story here for everyone. Liu has quickly become one of my favorite science fiction writers. The Wandering Earth by Cixin Liu is a collection of ten brilliantly written sci-fi stories that completely resonated with me on both an emotional and intellectual level. ![]() With a melancholic and keen understanding of human nature, Liu’s stories show humanity’s attempts to reason, navigate, and above all, survive in a desolate cosmos. Liu’s fiction takes the reader to the edge of the universe and the end of time, to meet stranger fates than we could have ever imagined. These ten stories, including five Chinese Galaxy Award-winners, are a blazingly original ode to planet Earth, its pasts, and its futures. Variational Methods for Multichannel Scattering with Three-Particle Breakupģ.3.A short story collection from New York Times bestselling author Cixin Liu. Variational Methods for Elastic Scattering and for Multichannel Scatteringģ. Padé Approximation and the Faddeev EquationsĢ. Padé Approximation and Integral Equationsģ. Solution of the Faddeev Equations by Padé ApproximationĢ. Practical Calculations with the Quasiparticle Methodħ. Application of the Quasiparticle Method to the Three-Particle Resolvent Equationģ.3. The Alt-Grassberger-Sandhas Equationsģ.2. The Quasiparticle Method in the Three-Particle Problemģ.1. The Schmidt Method (Weinberg's Quasiparticle Method)ģ. Direct Solution of the Faddeev Equations for Local PotentialĢ. Solution of the Faddeev Equations for Local Potentialġ. Results for Three Identical ParticlesĢ.7. Numerical Solution of the Faddeev Equations for Separable PotentialsĢ.5. Solution of the Faddeev Equations for Separable PotentialsĢ.4. Separable Potentials in the Two-Particle ProblemĢ. Some Concepts of the Theory of Integral Equationsġ. ![]() Partial Wave Decomposition of the Faddeev EquationsĢ. Solution Methods for the Faddeev Equationsġ. The Faddeev Equations for Transition OperatorsĤ. The Faddeev Equations for the Scattering Statesĥ. The Faddeev Equations for the Resolventģ. Resolvent Equation and Lippmann-Schwinger Equationġ. Boundary Conditions and Mφller OperatorsĢ.4. Two-Particle Subsystems in Three-Particle SpaceĢ.3. Resolvent Equation and Lippmann-Schwinger EquationĢ.2. Boundary Condition of the Scattering Stateġ.4. Importance of the Three-Body Problem in Nuclear Physicsġ.2. Scattering Experiments with Three-Particle Breakupģ. This book will be of value to students interested in three-particle physics and to experimentalists who want to understand better how the theoretical data are derived. A promising variational method for solving the Faddeev equations is described. This book concludes with an appraisal of variational methods for bound states, elastic and rearrangement scattering, and the breakup reaction. The solution of the Faddeev equations for separable potentials and local potentials is presented, along with the use of Padé approximation to solve the Faddeev equations. The chapters that follow are devoted to the Faddeev equations, including those for scattering states and transition operators, and how such equations can be solved in practice. Attention then turns to some concepts of quantum mechanics, with emphasis on two-particle scattering and the Hamiltonian for three particles. Scattering experiments with three-particle breakup are presented. This book has eight chapters the first of which introduces the reader to the quantum mechanical three-body problem, its difficulties, and its importance in nuclear physics. Topics include the two- and three-particle problem, the Faddeev equations and their solution, separable potentials, and variational methods. The Quantum Mechanical Three-Body Problem deals with the three-body problem in quantum mechanics. ![]()
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