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A representation theorem involving fractional derivatives for linear homogeneous chiral media
Author(s) -
Lakhtakia Akhlesh
Publication year - 2001
Publication title -
microwave and optical technology letters
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.304
H-Index - 76
eISSN - 1098-2760
pISSN - 0895-2477
DOI - 10.1002/1098-2760(20010320)28:6<385::aid-mop1048>3.0.co;2-l
Subject(s) - curl (programming language) , homogeneous , mathematics , operator (biology) , representation (politics) , fractional calculus , mathematical analysis , pure mathematics , computer science , combinatorics , biochemistry , chemistry , repressor , politics , transcription factor , political science , law , gene , programming language
A dyadic differential operator that commutes with the curl dyadic can be used to obtain new solutions of the Faraday and the Amperé–Maxwell equations in linear, homogeneous chiral media. Conditional extension of this representation theorem to bianisotropic media is also possible. An admissible operator may involve fractional derivatives. © 2001 John Wiley & Sons, Inc. Microwave Opt Technol Lett 28: 385–386, 2001.