学术探索
学术期刊
新闻热点
数据分析
智能评审

Fredholm method for scars

被引:39
作者
Fishman, S [1 ]
Georgeot, B [1 ]
Prange, RE [1 ]
机构
[1] TECHNION ISRAEL INST TECHNOL, DEPT PHYS, IL-32000 HAIFA, ISRAEL
来源
JOURNAL OF PHYSICS A-MATHEMATICAL AND GENERAL | 1996年 / 29卷 / 04期
关键词
D O I
10.1088/0305-4470/29/4/019
中图分类号
O4 [物理学];
学科分类号
0702 ;
摘要
A new quasiclassical formula for scars is obtained by using the Fredholm method. We show that it can be expanded into a formula obtained earlier by Agam and Fishman. The derivation is simple and direct. It is also more rigorous and more general than that of Agam and Fishman. It also clarifies the remarkable process of resurgence, relating the high-order terms based on long orbits to the Weyl term whose origin is the zero length orbits.
引用
收藏
页码:919 / 937
页数:19
相关论文
共 42 条
[11]   CALCULATING BOUND SPECTRUM BY PATH SUMMATION IN ACTION-ANGLE VARIABLES [J].
BERRY, MV ;
TABOR, M .
JOURNAL OF PHYSICS A-MATHEMATICAL AND GENERAL, 1977, 10 (03) :371-379
[12]   A RULE FOR QUANTIZING CHAOS [J].
BERRY, MV ;
KEATING, JP .
JOURNAL OF PHYSICS A-MATHEMATICAL AND GENERAL, 1990, 23 (21) :4839-4849
[13]   QUANTUM SCARS OF CLASSICAL CLOSED ORBITS IN PHASE-SPACE [J].
BERRY, MV .
PROCEEDINGS OF THE ROYAL SOCIETY OF LONDON SERIES A-MATHEMATICAL PHYSICAL AND ENGINEERING SCIENCES, 1989, 423 (1864) :219-231
[14]   SMOOTHED WAVE-FUNCTIONS OF CHAOTIC QUANTUM-SYSTEMS [J].
BOGOMOLNY, EB .
PHYSICA D, 1988, 31 (02) :169-189
[15]   SEMICLASSICAL QUANTIZATION OF MULTIDIMENSIONAL SYSTEMS [J].
BOGOMOLNY, EB .
NONLINEARITY, 1992, 5 (04) :805-866
[16]   PERIODIC-ORBIT QUANTIZATION OF CHAOTIC SYSTEMS [J].
CVITANOVIC, P ;
ECKHARDT, B .
PHYSICAL REVIEW LETTERS, 1989, 63 (08) :823-826
[17]   A scattering approach to the quantization of billiards-The inside-outside duality [J].
Dietz, Barbara ;
Smilansky, Uzy .
CHAOS, 1993, 3 (04) :581-589
[18]   CHAOTIC SPECTROSCOPY [J].
DORON, E ;
SMILANSKY, U .
PHYSICAL REVIEW LETTERS, 1992, 68 (09) :1255-1258
[19]   SEMICLASSICAL QUANTIZATION OF CHAOTIC BILLIARDS - A SCATTERING-THEORY APPROACH [J].
DORON, E ;
SMILANSKY, U .
NONLINEARITY, 1992, 5 (05) :1055-1084
[20]   QUANTUM-MECHANICS OF CLASSICALLY NON-INTEGRABLE SYSTEMS [J].
ECKHARDT, B .
PHYSICS REPORTS-REVIEW SECTION OF PHYSICS LETTERS, 1988, 163 (04) :205-297
12345