KRAMERS-KRONIG RELATIONS WITH LOGARITHMIC KERNEL AND APPLICATION TO THE PHASE SPECTRUM IN THE DRUDE MODEL

Authors
LEE MH SINDONI OI
Citation
Mh. Lee et Oi. Sindoni, KRAMERS-KRONIG RELATIONS WITH LOGARITHMIC KERNEL AND APPLICATION TO THE PHASE SPECTRUM IN THE DRUDE MODEL, Physical review. E, Statistical physics, plasmas, fluids, and related interdisciplinary topics, 56(4), 1997, pp. 3891-3896
Citations number
24
Categorie Soggetti
Physycs, Mathematical","Phsycs, Fluid & Plasmas
Journal title
Physical review. E, Statistical physics, plasmas, fluids, and related interdisciplinary topicsACNP
ISSN journal
1063651X
Volume
56
Issue
4
Year of publication
1997
Pages
3891 - 3896
Database
ISI
SICI code
1063-651X(1997)56:4<3891:KRWLKA>2.0.ZU;2-R
Abstract
Standard Kramers-Kronig relations are formulated on the premise that t he response functions are well behaved asymptotically. In certain phys ical problems in which the functions are logarithmic, one may then nee d to reformulate these relations. This was recently pointed out very; explicitly in an optical context by Nash, Bell, and Alexander [J. Mod. Opt. 42, 1837 (1995)]. Much earlier this issue was discussed more gen erally. We examine in some detail the mathematical problem by consider ing the phase spectrum in the Drude model. Comparison is made between the standard and the reformulated forms of Kramers-Kronig relations.