On the Functional Relation Between Quality Factor and Fractional Bandwidth

The functional relation between the fractional bandwidth and the quality factor of a radiating system is investigated in this communication. Several widely used definitions of the quality factor are compared with two examples of RLC circuits that serve as a simplified model of a single-resonant antenna tuned to its resonance. It is demonstrated that for a first-order system, only the quality factor based on differentiation of the input impedance has unique proportionality to the fractional bandwidth, whereas, e.g., the classical definition of the quality factor, i.e., the ratio of the stored energy to the lost energy per one cycle, is not uniquely proportional to the fractional bandwidth. In addition, it is shown that for higher order systems, the quality factor based on differentiation of the input impedance ceases to be uniquely related to the fractional bandwidth.

[1]  Craig A. Grimes,et al.  Time-domain measurement of antenna Q , 2000 .

[2]  Roger F. Harrington,et al.  Control of radar scattering by reactive loading , 1972 .

[3]  A.D. Yaghjian,et al.  Impedance, bandwidth, and Q of antennas , 2003, IEEE Transactions on Antennas and Propagation.

[4]  Mats Gustafsson,et al.  Stored Electromagnetic Energy and Antenna Q , 2012, 1211.5521.

[5]  R. Collin,et al.  A New Chu Formula for Q , 2009, IEEE Antennas and Propagation Magazine.

[6]  Donald R. Rhodes,et al.  Observable stored energies of electromagnetic systems , 1976 .

[7]  S.R. Best,et al.  Limitations in Relating Quality Factor to Bandwidth in a Double Resonance Small Antenna , 2007, IEEE Antennas and Wireless Propagation Letters.

[8]  Mats Gustafsson An overview of current optimization and physical bounds on antennas , 2014 .

[9]  Randal Hugh Direen,et al.  Fundamental Limitations on the Terminal Behavior of Antennas and Nonuniform Transmission Lines , 2010 .

[10]  Mats Gustafsson,et al.  Q factors for antennas in dispersive media , 2014, 1408.6834.

[11]  Wen Geyi,et al.  The Foster reactance theorem for antennas and radiation Q , 2000 .

[12]  V. G. Polevoi Maximum energy extractable from an electromanetic field , 1990 .

[13]  Guy A. E. Vandenbosch Reply to "Comments on 'Reactive energies, impedance, and Q factor of radiating structures'" , 2013 .

[14]  P. Morse,et al.  Methods of theoretical physics , 1955 .

[15]  Lukas Jelinek,et al.  The Measurable Q Factor and Observable Energies of Radiating Structures , 2014, IEEE Transactions on Antennas and Propagation.

[16]  R. Collin Foundations for microwave engineering , 1966 .

[17]  D. Kajfez,et al.  Invariant Definitions of the Unloaded Q Factor (Short Paper) , 1986 .

[18]  R. M. Foster,et al.  A reactance theorem , 1924 .

[19]  Mats Gustafsson,et al.  Bandwidth, Q factor, and resonance models of antennas , 2005 .

[20]  D. Rhodes,et al.  A reactance theorem , 1977, Proceedings of the Royal Society of London. A. Mathematical and Physical Sciences.

[21]  J. Swinburne Electromagnetic Theory , 1894, Nature.

[22]  L. J. Chu Physical Limitations of Omni‐Directional Antennas , 1948 .