We developed theory to compute the fields generated within Resistive Plate Chambers (RPC's) and the
signals induced in the electrodes
of RPC's by a point charge
moving in the gas gap with constant velocity along a trajectory
perpendicular to the electrode planes. The induced currents can
be determined with the help of Ramo's theorem (1939) *). This theorem
expresses the current induced by a moving charge by the
product of the charge motion with a static field called weighting
fields, which would be generatred in the same configuration in the
absence of the charge by a static Voltage applied to the
electrode. Ramo's proof assumed isolating dielectrics between the
electrodes. RPC's comprise several layers, whose resistivity is high
but not infinite. Indeed, it is so high that the resulting
decay rate is very long as compared to the times, which the particles
or their fields need to cross the structure. Riegler (2002) of CERN
generalized Ramo's theorem to the case where the dielectric has a low
conductivity; for this, he used a quasi-static theory for
weakly conducting media presented by Heubrandtner and Schnizer (2002).
In another approach one may compute the field generated in the
configuration by the moving charge; from this time-dependent field one
may also derive the currents induced in the electrodes. This
approach was started by Schoepf and Schnizer in 1992.
The investigations just described show that the conductivity and
permittivity of the layers in-between the gas gap and the electrodes is
quite small for the values of these quantities used in real RPC's. So
it is mainly the electrode structure which determines the weighting
field which may be used to calculate the signal. We derived
expressions for the potential and field present in simple
two-dimensional models for such structures by conformal maps. These
have implemented in user-friendly Mathematica programs calculating and
plotting potential and field distributions and signal currents in the
electrodes.
Standard detector physics simulations can only be performed by
numerical methods. Such studies involve also the space charge
dueto the electron cloud (avalanche) present and growing in the
"on" time of the detector. For dynamic calculations of the
electric field of the space charge, it is very useful to have analytic
expressions (Green's functions represented as series and/or integrals)
for the field of a point charge in such a layered structure. These
expressions have been rendered more useful by improving their
convergence properties.
*) W. Blum, L. Rolandi, Particle detection with drift chambers.
Springer, Berlin, 1994.
Ramo's theorem and
the quasi-static approximation
The generalization of Ramo's theorem for weakly conducting media and
applications to signals induced in infinite or strip electrodes were
derived in:
W. Riegler,
Induced
signals in resistive plate chambers.
Nucl.
Instrum.
Methods Phys. Res., A : 491 (2002) pp.258-271
The method used in this paper is described in the following papers:
Th.
Heubrandtner, B Schnizer,
The
quasi-static electromagnetic approximation for weakly conducting media
Nucl.Inst.Meth. Phys. Res. A478 (2002) 444-447
Th. Heubrandtner,
B.
Schnizer, W. Riegler,
The
quasi-static approximation for weakly conducting media and
applications.
Proceedings, 11th Internat. IGTE Symp. on Num. Field Calc. in Electr.
Eng.,
Seggau
Castle, Sept. 13 - 15, 2004 , pp. 138-143. pap83
Th.
Heubrandtner, B. Schnizer, L. Dedek,
A
quasi-static method for solving transient problems in weakly
conducting media.
Kleinheubacher Berichte 43 (2000) 445-451 pap76
Time-dependent fields
due to point charges moving in chamber structures
Such fields were investigated in the following papers:
Th. Heubrandtner,
Theoretical
Models for Signal Generation in Resistive Plate Chambers.
Doctoral
dissertation, Faculty of Science, Technical University of Graz, May
1999. HeubraDiss in papers
H. Schöpf, B. Schnizer
Theory
describing cathode signals from charges moving in counters with a
poorly conducting
cathode.
Proc. 1992 Wire chamber Conf. Vienna, 18-21 February 1992.
Nucl.Inst.Meth. Phys. Res. A323 (1992), 338-344 Th. Heubrandtner, B. Schnizer, H. Schöpf, Signals
in a Resistive Plate Chamber
Kleinheubacher Berichte 41
(1998) 484 - 489
Conformal maps and Mathematica programs for computing wheighting
fields
The following two-dimensional models were investigated by conformal
maps and the resulting formulae implemented in Mathematica programs
stored in the subdirectory Mathematica programs
for weighting fields :
An infinite empty plane condensor, whose upper
electrode contains a strip with an impressed Voltage.The remaining
parts or electrodes are grounded. The corresponding Mathematica
notebooks are: CondVoStr.nb
and CondShVoStr.nb
There is a LongWriteUp notebook in which the conformal map is also
discussed: CondVoStrLW.nb
An infinite empty plane condensor; the upper electrode is
semiinfinite and a Voltage is supplied to it;
the lower electrode is grounded. The corresponding notebook is: ShSemInfCond.nb
An infinite empty plane condensor, whose
upper electrode is split in two by a gap of given finite width.
The semiinfinite electrode at the right and the lower one are grounded.
A Voltage is supplied to the other semiinfinite electrode.
The corresponding notebook is: SplitCond.nb
In the same subdirectory there is a LongWriteUp notebook in which the
conformal map is also discussed: SplitCondLW.nb
The program subdirectory contains
several notebooks in which the different models are
compared: Comparison.nb,
RS-Comp-SemInf-Strip.nb, RS-Comp-Split-SemInf-Strip.nb,
RS-Comp-Split-SemInf.nb, RS-Comp-Split-Strip.nb.
This
comparison is dynamic inasmuch as the widths of the gap and
if the strip are made to vary in the notebookAnimation.nb or in
the GIF-file
Animation.gif .
The theory and descriptions of the programs are given in the following
papers:
Th.
Heubrandtner, B. Schnizer, G. Schweitzer,
Simple Models
for RPC Weighting Fields and Potentials.
Nucl. Instrum.
Methods Phys. Res., A : 535 (2004) no.1-2, pp.454-457
St.Rossegger,
B. Schnizer, G. Schweitzer,
Comparison of
simple models for RPC weighting fields and potentials.
Nucl.Inst.Meth. Phys. Res. A 535 (2004) 554 - 557
Revised and
extended unpublished version of previous paper pap82a in papers
Mathematica programs ploting potentials and fields in similar and other
configurations can be found at the
page Conformal Maps
Green's functions for layered structures and space charge studies
Th.
Heubrandtner, B. Schnizer, C. Lippmann, W. Riegler,
Static
electric fields in an infinite plane condensor with one or three
homogeneous layers.
Nucl. Instrum.
Methods Phys. Res., A : 489 (2002) no.1-3, pp.439-443
(=
CERN-EP-2002-004 ; Geneva : CERN , 8 Jan 2002)
Th.
Heubrandtner, B. Schnizer, C. Lippmann, W. Riegler,
Static
electric fields in an infinite plane condensor with one or three
homogeneous
layers.
Report
CERN-OPEN-2001-074, 31 Oct. 2001
(This is an
extended preprint version of the previous paper)
C. Lippmann,
W. Riegler, B. Schnizer
Space
charge effects and induced signals in resistive plate chambers.
Nucl. Instrum.
Methods Phys. Res., A : 508 (2003), pp.19 - 22