改进的绿色-双曲算子

IF 0.9 3区 物理与天体物理 Q2 MATHEMATICS
C. Fewster
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引用次数: 1

摘要

Green-双曲算子——具有高级和迟钝绿色算子的全局双曲时空上的偏微分算子(连同它们的形式对偶),在数学物理的许多领域中起着重要的作用。本文通过在时空的紧子集$K$中加入一个可能的非局部算子,研究了对Green-双曲算子的修正,并寻求相应的'$K$-非局部'广义Green算子。假设修正全纯依赖于一个参数,给出了除离散集可能存在外,所有参数值都存在K -非局部Green算子的条件。异常点恰好发生在修正算子允许具有过去或未来紧支持的非平凡光滑齐次解的地方。Fredholm理论用于将这些空间的维度与形式对偶算子对应的维度联系起来,转换未来和过去的角色。证明了K -非局部Green算子全纯依赖于合适Sobolev空间之间的映射或光滑函数的合适空间之间的映射的有界收敛拓扑中的参数。描述了在方程组LU分解中的一个应用。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Modified Green-Hyperbolic Operators
Green-hyperbolic operators - partial differential operators on globally hyperbolic spacetimes that (together with their formal duals) possess advanced and retarded Green operators - play an important role in many areas of mathematical physics. Here, we study modifications of Green-hyperbolic operators by the addition of a possibly nonlocal operator acting within a compact subset $K$ of spacetime, and seek corresponding '$K$-nonlocal' generalised Green operators. Assuming the modification depends holomorphically on a parameter, conditions are given under which $K$-nonlocal Green operators exist for all parameter values, with the possible exception of a discrete set. The exceptional points occur precisely where the modified operator admits nontrivial smooth homogeneous solutions that have past- or future-compact support. Fredholm theory is used to relate the dimensions of these spaces to those corresponding to the formal dual operator, switching the roles of future and past. The $K$-nonlocal Green operators are shown to depend holomorphically on the parameter in the topology of bounded convergence on maps between suitable Sobolev spaces, or between suitable spaces of smooth functions. An application to the LU factorisation of systems of equations is described.
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来源期刊
CiteScore
1.80
自引率
0.00%
发文量
87
审稿时长
4-8 weeks
期刊介绍: Scope Geometrical methods in mathematical physics Lie theory and differential equations Classical and quantum integrable systems Algebraic methods in dynamical systems and chaos Exactly and quasi-exactly solvable models Lie groups and algebras, representation theory Orthogonal polynomials and special functions Integrable probability and stochastic processes Quantum algebras, quantum groups and their representations Symplectic, Poisson and noncommutative geometry Algebraic geometry and its applications Quantum field theories and string/gauge theories Statistical physics and condensed matter physics Quantum gravity and cosmology.
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