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相关论文: Lattice Discretization in Quantum Scattering

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A brief description of the novel approach towards solving few-body scattering problems in a finite-dimensional functional space of the $L_2$-type is presented. The method is based on the complete few-body continuum discretization in the…

核理论 · 物理学 2009-11-13 V. N. Pomerantsev , V. I. Kukulin , O. A. Rubtsova

We incorporate non-zero lattice-spacing effects into L\"uscher's finite-volume scattering formalism. The new quantization condition takes lattice energies as input and returns a version of the discretized scattering amplitude whose…

高能物理 - 格点 · 物理学 2024-08-14 Maxwell T. Hansen , Toby Peterken

A new method to solve the Dirac equation on a 3D lattice is proposed, in which the variational collapse problem is avoided by the inverse Hamiltonian method and the fermion doubling problem is avoided by performing spatial derivatives in…

核理论 · 物理学 2017-02-14 Z. X. Ren , S. Q. Zhang , J. Meng

A self-contained discussion of nonrelativistic quantum scattering is presented in the case of central potentials in one space dimension, which will facilitate the understanding of the more complex scattering theory in two and three…

量子物理 · 物理学 2009-11-06 Vania E. Barlette , Marcelo M. Leite , Sadhan K. Adhikari

Contact interactions can be used to describe a system of particles at unitarity, contribute to the leading part of nuclear interactions and are numerically non-trivial because they require a proper regularization and renormalization scheme.…

高能物理 - 格点 · 物理学 2020-01-20 Christopher Körber , Evan Berkowitz , Thomas Luu

A recently proposed renormalization scheme can be used to deal with nonrelativistic potential scattering exhibiting ultraviolet divergence in momentum space. A numerical application of this scheme is made in the case of potential scattering…

高能物理 - 理论 · 物理学 2012-08-27 C. F. de Araujo, , L. Tomio , S. K. Adhikari , T. Frederico

Presented is a quantum computing representation of Dirac particle dynamics. The approach employs an operator splitting method that is an analytically closed-form product decomposition of the unitary evolution operator. This allows the Dirac…

量子物理 · 物理学 2013-07-16 Jeffrey Yepez

We introduce an efficient lattice regularization scheme for quantum Monte Carlo calculations of realistic electronic systems. The kinetic term is discretized by a finite difference Laplacian with two mesh sizes, a and a', where a'/a is an…

其他凝聚态物理 · 物理学 2009-11-11 Michele Casula , Claudia Filippi , Sandro Sorella

We derive a fully discrete Inverse Scattering Transform as a method for solving the initial-value problem for the Q3$_\delta$ lattice (difference-difference) equation for real-valued solutions. The initial condition is given on an infinite…

可精确求解与可积系统 · 物理学 2012-10-09 Samuel Butler

A qubit lattice algorithm (QLA) is developed for Maxwell equations in a two-dimensional Cartesian geometry. In particular, the initial value problem of electromagnetic pulse scattering off a localized 2D dielectric object is considered. A…

光学 · 物理学 2022-11-09 G. Vahala , M. Soe , L. Vahala , A. K. Ram

In this paper, we use a straightforward numerical method to solve scattering models in one-dimensional lattices based on a tight-binding band structure. We do this by using the wave packet approach to scattering, which presents a more…

物理教育 · 物理学 2022-07-06 M. Staelens , F. Marsiglio

We introduce a lattice random walk discretisation scheme for stochastic differential equations (SDEs) that samples binary or ternary increments at each step, suppressing complex drift and diffusion computations to simple 1 or 2 bit random…

数值分析 · 数学 2026-02-18 Samuel Duffield , Maxwell Aifer , Denis Melanson , Zach Belateche , Patrick J. Coles

Lattice radial quantization is introduced as a nonperturbative method intended to numerically solve Euclidean conformal field theories that can be realized as fixed points of known Lagrangians. As an example, we employ a lattice shaped as a…

高能物理 - 格点 · 物理学 2013-11-26 Richard Brower , George Fleming , Herbert Neuberger

We investigate thin-slit diffraction problems for two-dimensional lattice waves. The peculiar structure allows us to consider the problems on the semi-infinite triangular lattice, consequently, we study Dirichlet problems for the…

数学物理 · 物理学 2022-07-12 David Kapanadze , Ekaterina Pesetskaya

In this research, we present a Python-based solution designed to simulate a one-dimensional quantum system that incorporates multiple Dirac $\delta -$% potentials. The primary aim of this research is to investigate the scattering problem…

量子物理 · 物理学 2024-06-04 Erfan Keshavarz , S. Habib Mazharimousavi

We solve inverse scattering problem for Schr\"odinger operators with compactly supported potentials on the half line. We discretize S-matrix: we take the value of the S-matrix on some infinite sequence of positive real numbers. Using this…

数学物理 · 物理学 2020-10-08 Evgeny L. Korotyaev

A problem of scattering by a Dirichlet right angle on a discrete square lattice is studied. The waves are governed by a discrete Helmholtz equation. The solution is looked for in the form of the Sommerfeld integral. The Sommerfeld…

数学物理 · 物理学 2021-12-21 A. V. Shanin , A. I. Korolkov

We study several numerical discretization techniques for the one-space plus one-time dimensional Dirac equation, including finite difference and space-time finite element methods. Two finite difference schemes and several space-time finite…

数值分析 · 数学 2014-12-04 Robert Vaselaar , Hyun Lim , Jung-Han Kimn

A general approach to a solution of few- and many-body scattering problems based on a continuum-discretization procedure is described in detail. The complete discretization of continuous spectrum is realized using stationary wave packets…

核理论 · 物理学 2015-01-16 O. A. Rubtsova , V. I. Kukulin , V. N. Pomerantsev

Scattering of a time harmonic anti-plane shear wave due to either a pair of crack tips or a pair of rigid constraint tips on square lattice is considered. The two problems correspond to the so called zero-offset case of scattering due to a…

数学物理 · 物理学 2023-12-21 Basant Lal Sharma , Gaurav Maurya
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