An Electrostatic Storage Ring for Low Energy Electron
CollisionsT J Reddish, D R Tessier, P Hammond*, A J Alderman*, M R
Sullivan, P A Thorn and F H Read
Department of Physics, University of Windsor, Windsor, Canada
N9B 3P4*School of Physics, CAMSP, University of Western Australia,
Perth WA 6009, Australia School of Physics and Astronomy,
University of Manchester, Manchester M13 9PL, UKIntroductionA
racetrack shaped, desk-top sized electrostatic storage ring has
been developed [1]. The apparatus is capable of storing any low
energy charged particle (i.e. electrons, positrons, ions) and in
the longer term, will be used for ultra-high resolution electron
spectroscopy. We are currently investigating the performance of the
spectrometer using electrons and hence refer to the system as an
Electron Recycling Spectrometer (ERS). We will shortly be extending
this design concept to ions. Specifications Orbital circumference
of the storage ring is 0.65m. Typical orbit time is 250ns 350ns for
electrons, depending on energy. Electrons energies at the
interaction region 150 eV. Storage lifetimes of ~50 ms have been
observed, corresponding to ~200 orbits.RecyclingThe sharp peaks in
the spectrum below correspond primarily to fast electrons that have
elastically scattered from helium target gas. (A background signal
from metastable helium ions has been removed form the spectrum.)
Each peak corresponds to a further orbit of the initial injection
pulse and clearly shows recycling continuing for 48 s. Also
highlighted in this spectrum is the decaying amplitude of the
electron signal. The (x 200) insert shows the recycling peaks
uniformly decaying in amplitude and characterized by a 13.6 s decay
life-time. [1] Tessier et al., Phys. Rev. Lett., 99 253201, 2007.
Criteria For Stable RecyclingStandard matrix methods are used to
predict the trajectories of charged particles within storage
rings.www.uwindsor.ca/reddishElectrostatic thick lens. Focal
lengths: f1 and f2; mid-focal lengths: F1 and F2; position of
target and image: P and Q, respectively. K1 = P F1 ; K2 = Q
F2.where and L are real. Employing the two expressions for Mss, as
described in [2], results in:In any real system the lens geometry
is fixed and the lens parameters f1, f2, K1, K2, defined in the
Figure above, are controlled by the applied voltages.Physically,
this signifies both the overall linear and angular magnifications
are 1, and therefore do not diverge with multiple orbits. Mss can
be determined as the product of the transfer matrices for smaller
sections of the storage ring. Hence Mss= MstMts, where Mst is the
transfer matrix for the source to target section of the storage
ring and Mts, that for the target to source section.Under symmetric
operating conditions the potentials, V3, of the source and
interaction regions are equal. Additionally the potentials of the
top and bottom hemispheres, V1, are the same and the potentials,
V2, are the same for all four lenses. Therefore the ERS is
symmetric in both reflection planes A and B (see schematic diagram)
and Mst is equal to Mts. Mst = m2mhm1, where m1, mh, and m2 are
defined below. (H,m) modes describe a trajectory that, if paraxial,
retraces itself every H/m orbits. In [2] we show that odd H, even m
modes are unstable due to angular aberrations in the hemispherical
analysers.Below is a mosaic plot showing the logarithm of ERS yield
as a function of storage time and V2 for V3/V1 = 2. There are
several regions of stability, the strongest at V2 = 130 V
corresponding to the (H,m) = (2,1) mode. The other regions are also
in good agreement with the predictions, as shown. See [2] for more
details.We now consider asymmetric operating conditions. This is
achieved by breaking the symmetry in reflection plane A. To do this
we set different potentials on the lenses in the top (V2t) and
bottom (V2b) halves of the ERS and/or set different pass energies
to the top and bottom hemispherical analysers.The left figure below
shows the predicted regions of stability for a range of lens
potentials, with V1t = 9V, V1b = 18V. The blue shaded areas in the
figure are regions of expected stability.The right figure below is
experimental data taken with the same potentials as the theory on
the left.[2] Hammond et al. N. J. Phys. 11 043033, 2009.Lens 2 is
physically the same as lens 1, but traversed by the electrons in
the opposite direction.The above figure shows the numerically
computed non-paraxial trajectory of an electron undertaking
multiple orbits of the ERS close to the H = 2 and m = 1 condition.
Although the trajectory does not retrace itself after 2 orbits,
which occurs when (2,1) is exactly satisfied, it does still produce
an overall time averaged stable beam.
Box sizes with text.Hit to start anew line of text.
Adjust the width of the box to change the paragraph width. Box's
height adjusts according to text.
HDA 2
x Displacement (mm)
Target
Lens 1
HDA 2
HDA 1
HDA 1
Source
Lens 4
Lens 2
Lens 3
y Displacement (mm)
Box sizes with text.Hit to start anew line of text.
30
120
140
130
90
100
110
V2
0
20
150
Time (ms)
(2,1)
(5,2)
(3,1)
Mode
(3,2)
160
V3/V1 = 2
(7,2)
(4,1)
10
0
