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Review of the Air Force Academy No 2 (32) 2016 THE RESONANCE FREQUENCY CORRECTION IN CYLINDRICAL CAVITIES IN AXIAL DIRECTION Gheorghe MORARIU, Otilia CROITORU Transilvania University, Brasov, Romania ([email protected], [email protected]) DOI: 10.19062/1842-9238.2016.14.2.13 Abstract: The paper presents a model for determining more precisely the axial resonance frequency in cylindrical resonant cavity. It is known that resonance frequencies on axial direction of the electric field in cylindrical resonant cavity are determined by null points of the Bessel function J0 but, in practical experiments be noticed a shift in positive direction of the real resonance frequency compared to that calculated. Just this correction is made in this paper. Keywords: electromagnetic field, distribution, Bessel. 1. INTRODUCTION To calculate the resonance frequencies in cylindrical and elliptical cavities, it requires a full analysis of electromagnetic (EM) phenomena that happen in this volume. In addition to the Bessel function for field oscillation, the paper presents the analytical field distribution function in opening cavity radius, phenomena taking place simultaneously. The paper is structured in three parts: deduction of distribution function of electromagnetic field, attaching the J0 Bessel distribution function, conclusions on the result obtained. 2. DEDUCTION OF DISTRIBUTION FUNCTION OF EM FIELD For deduction of the distribution function of EM field, is used drawing in FIG. 1 and Maxwell’s equations for dynamic field. FIG. 1. Schematic representation of the oscillation phenomenon of cavity 109 The Resonance Frequency Correction in Cylindrical Cavities in Axial Direction (1) (2) => (3) (4) (I) The first iteration (5) (6) Writing relation (4) for the contour Γ1, is obtained: (7) Solving integrals, equation (7) becomes: (8) After derivation, follow: (9) (10) (II) The second iteration (11) 110 Review of the Air Force Academy No 2 (32) 2016 => (12) (13) (14) => (15) (III) The third iteration (16) => (17) (18) => (19) If it continues, is obtained the overall intensity of the electric field ET as an expression of the form: (20) If we denote , we get the expression: (21) 111 The Resonance Frequency Correction in Cylindrical Cavities in Axial Direction This relation can be written as: (22) This is the series expansion of the function: (23) Or, (24) This expression represents the global electric field intensity distribution, function of the radius cylindrical resonator: (25) In this expression, for a resonance frequency known, (26) FIG. 2. The distribution of EM field 3. ATTACHING THE J0 BESSEL DISTRIBUTION FUNCTION If the calculation is repeated with iterations I, II, III... where is considered that and (phenomenon development on radius) is obtained the series: (27) 112 Review of the Air Force Academy No 2 (32) 2016 This expression, in restricted form, is: (28) J0 is the Bessel function of the first kind and zero order and describes at zero crossings, the frequencies around which is carried out the resonance phenomenon of the cylindrical cavity. In practical measurements it has been observed that the real resonance frequencies are shifted slightly to the right compared to the zero crossings of Bessel function, . This frequency deviation, ∆f, results from overlapping the function ET over the function E, the two components of the electric field intensity taking place simultaneously. (29) Thus, the correction function is: (30) FIG. 3. The Bessel function J0. 3. CONCLUSIONS The diagrams in FIG. 2 and FIG. 3 represents the EM field radius distribution, respectively the Bessel function J0, with independent action. In the diagram in FIG. 4, the Bessel function J0 and the correction function P(X) are simultaneously represented. This figure shows the displacement frequency correction (zero-crossing of P(X)) compared to Bessel function, in this way: 113 The Resonance Frequency Correction in Cylindrical Cavities in Axial Direction FIG. 4. The Bessel function J0 and the correction function P(X) The first null of Bessel function is x = 2.405. The first null of P(X) function is x = 2.47. The second null of Bessel function is x = 5.52. The second null of P(X) function is x = 5.543. The resonance frequencies obtained from the correction function P(X) have better accuracy with an order of magnitude compared to Bessel function. REFERENCES [1] S.S. Bayin, Essentials of Mathematical Methods in Science and Engineering, Wiley, 2008; [2] George B. Arfken and Hans J. Weber, Mathematical Methods for Physicists, 6th edition (Harcourt: San Diego, 2005; [3] N. Teodorescu, V. Olariu, Differential equations and with partial derivates I, II, III, Technical Publishing, 1980; [4] G. Drăgoi - Technique very high frequencies, Military Academy Publishing, Bucharest, 1988; [5] SKILLING Electric Transmission Lines, McGraw-Hill Book Co, New York; [6] https://mail.uaic.ro/~gasner/FT4_Fizica_Microundelor/FT4_01_Introducere.pdf; [7] Leighton, Robert B.; Sands, Matthew: The Feynman Lectures on Physics, New Millennium Edition, Vol. II, Basic Books, New York, 2010; [8] D. Meeker, Finite Element Method Magnetics, femm.info/Archives/contrib/manual_ro.pdf, 2002. 114