... | ... | @@ -1932,7 +1932,7 @@ B_z &= 0 |
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\end{aligned}
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++++
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where latexmath:[ L ] is the length and latexmath:[ R ] the radius of the pillbox, latexmath:[ J_m ] is the m-th Bessel function of the first kind, latexmath:[ x_{mn} ] is the n-th root of latexmath:[ J_m ] and latexmath:[ k_{mn} = \frac{x_{mn}}{R}].
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where latexmath:[ L ] is the length and latexmath:[ R ] the radius of the pillbox, latexmath:[ J_m ] is the m-th Bessel function of the first kind, latexmath:[ x_{mn} ] is the n-th root of latexmath:[ J_m ], latexmath:[ k_{mn} = \frac{x_{mn}}{R}] and latexmath:[ \omega = c\cdot\sqrt{k_{mn}^2 + \left(\frac{p\pi}{L}\right)^2}].
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The computed field for TE~mnp~ is:
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... | ... | @@ -1949,14 +1949,14 @@ B_z &= B_0 J_m(k_{mn} r) \cos(m \varphi) \sin(\frac{p\pi}{L}z) \exp(\dot{\ |
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\end{aligned}
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++++
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where latexmath:[ L ] is the length and latexmath:[ R ] the radius of the pillbox, latexmath:[ J_m ] is the m-th Bessel function of the first kind, latexmath:[ x_{mn}^\prime ] is the n-th root of the first derivative of latexmath:[ J_m ], latexmath:[ k_{mn} = \frac{x_{mn}^\prime}{R}] and latexmath:[ \omega = c\cdot\sqrt{k_mn^2 + \left(\frac{p\pi}{L}\right)^2}].
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where latexmath:[ L ] is the length and latexmath:[ R ] the radius of the pillbox, latexmath:[ J_m ] is the m-th Bessel function of the first kind, latexmath:[ x_{mn}^\prime ] is the n-th root of the first derivative of latexmath:[ J_m ], latexmath:[ k_{mn} = \frac{x_{mn}^\prime}{R}] and latexmath:[ \omega = c\cdot\sqrt{k_{mn}^2 + \left(\frac{p\pi}{L}\right)^2}].
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The attributes of the `PILLBOX` command are:
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---
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----
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label:PILLBOX, L=real, SCALE=real, DSCALE=real, LAG=real, DLAG=real,
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RADIUS=real, M=real, N=real, P=real, APVETO=boolean;
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---
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----
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L::
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The length of the cavity (default: 0_m)
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