Last Measurement on GEM and Literature review of Conduction in Polymers Gabriele Croci (CERN) GDD Meeting February, the 21st
Leakage Current in 10x10 GEM 2 ZOOM
Leakage Current in Cu covered Kapton Foil (GEM 10X10 without holes) 3
Comparison Holes/No Holes 4 The major effect seems to come from surface conduction
REFERENCES [1] P. Keith Watson, “The transport and Trapping of Electrons in Polymers”, IEEE Transaction on Dielectrics and Electrical Insulation, Vol. 2 No 5. October 1995 [2] John J. Simmons, “Poole-Frankel Effect and Schottky Effect in Metal-Insulator-Metal Systems”, Physical Review, Volume 155,3, 15 March 1967 [3] E. Motyl, “Electrode Effects and Electrical Conduction in Polyimide Kapton HN Films”, IEEE Internation Conference on Conduction and Breakdown in Solid Dielectrics, June [4] J-P Salveat et al “Onset and growth of conduction in polyimide Kapton induced by swift heavy- ion irradiation”, Physical Review B, Volume 55, Number 10, 1 March 1997-II [5] A. Rose, “Space-Charge Limited Currents in Solids”, Physical Review Volume 97, Number 6, March 15, 1955 [6] Edward J. Yadlowsky, Robert C. Hazelton, “Radiation Induced conduction in Kapton H Film”, IEEE Transactions on Nuclear Science, Volume 35, No 4, August 1988 [7] R.G. Filho et al, “Induced conductivity Of Mylar and Kapton Irradiated by X-Rays”, IEEE Transactions on Electrical Insulation Volume EI-21 No. 3, June
General Polymer Description A polymer is a substance composed of molecules with large molecular mass composed of repeating structural units, or monomers, connected by covalent chemical bonds moleculesmolecular massstructural units monomerscovalentchemical bonds Poliymide (Kapton, dielectric used in GEM) belongs to the polymer family 6
General statements about Conduction in Polymers Polymers conductivity can be due to the small number of low-mobility charge carriers and to the high trap density [1] The traps can play a very important role in the carrier recombination process; they can trap carriers and release them in a successive time [1] Mobility changes of several order of magnitude with respect the free (without traps) mobility Dependence on temperature, applied electric field and particle (e-, p+, X-rays, Ions..) irradiation 7
Energy Band Diagram in a Polymer [1] Slight difference from organized structure like metals or semiconductors The conduction band edge is substituted by the mobility edge and we can keep the concept of valence band The trap levels are usually between this two states Tentative to discover the energy distribution of these trapping states injecting electrons inside the polymer 8
Some possible origins of trapping centers Impurities in the material [2] Presence of Radicals in the polymer Chemical structure of polymer chain Open covalent (0,C) bounds Regions of free volumes …. 9
Charge Trapping and Decay (1)[1] The model described in [1] does not take into account retrapping after a charge is released by a trap: this holds for thin polymers The current flowing in the polymer is a function of the energy density of the traps Definition of a trapping parameter α=1/μτE (μ:mobility, τ:characteristic time, E: electric field in the polymer) Electron is shallow states are rapidly detrapped and are driven more deeply in the material by the field 10
Charge Trapping and Decay (2) The charge detrapped can contribute to the conduction and can accumulate on the surface of the polymer Measurement of Surface Potentials (Vs) with time 11
Other Possible Conduction Mechanisms [2],[3],[4] Poole-Frenkel effect Schottky Effect Hopping Tunneling Space charge limited currents 12
Poole-Freknel Effect P-F: field-assisted thermal ionization; lowering of a Coulombic potential barrier with an electric field; it is associated with the lowering of a trap barrier in the bulk Change of work function: W W- eβ PF E ½ Change of conductivity: σ=σ 0 exp(β PF E ½ /kT) 13
Schottky Effect Very similar to Poole-Frenkel Effect. It is the attenuation of a metal-insulator barrier arising from electrode image force interaction. It is a surface effect Change of conductivity similar to P-F σ=σ 0 exp(β s E ½ /kT) β PF =2β s 14
Hopping Models[4] Presence of π-conjugated bonds; phonon assisted tunneling between localized states Two basic processes: local jumping between adjacent sites and “percolation” A hop between two localized electronic states occurs when the atomic vibratory motion changes the relaive energy of the localized states Two kinds of hops – Adiabatic: large electron energy transfer between states; jump rate not limited by electron energy transfer or distance between sites – Non Adiabatic: low electron energy transfer; jump rate limited by transfer energy and distances 15
Tunneling and Space Charge Limited Current Tunneling is the quantum effect of passing through a barrier also if the energy is not enough to overcame the barrier itself Space charge limited current[5]: maximum current that can flow in a built-up capacitor charged with static charges. The current can be enhanced by PF effect. Current density has a voltage square dependence 16
Radiation Induced Conduction in Kapton H Film [6] 8 μm thick kapton irradiated by 45 KeV penetrating electrons I-V characteristic depends on the voltage applied to the irradiated sample: – Low Voltage (<50V): Ohmic regime, Linear I-V Characteristic – Intermediate Voltage (50V<V<700V): Space Charge Limited Current (SCL) regime, I proportional to V 2 – High Voltage (>700V): Trap Filled limit regime (TFL), I exponentially proportional to V 17
Conduction Model [6] This is the math form of previous statements It is possible to see three different regimes at different voltage values for current density The constant A,B,C take into account all the parameters of the material and of the irradiation; h take into account also the energy gap over which the traps are distributed 18
Induced Conductivity of Mylar and Kapton Irradiated by X-Rays [7] Kapton Samples of 80 mm diameter with thickness varying from 6 to 75 μm were irradiated with W X-Rays for several hours Electric field (of different intensity) were applied to the samples They saw a variation of the Kapton conductivity 19
Induced Conductivity of Mylar and Kapton Irradiated by X-Rays [7] (2) 20 From my calculation and considering the rate we are using in our lab to test GEM, we are very close to the black curve Next week I will perform this kind of measurement irradiating a 10x10 GEM for several hours to see if there is a variation of the conductivity