Numerical simulations on single mask conical GEMs Fri, 13th March 2009 – CERN Marco Villa
The standard GEMs
Photolithographic technique used to prepare standard GEMs
Why simulations on conical GEMs? Why conical GEMs? Why simulations on conical GEMs? Large Area GEMs ↓ very difficult to align the two masks on the top and bottom side What are the properties of the GEM foils obtained with single mask lithographic technique? How do these properties depend on the geometry? spatial uniformity time stability electron transparency discharge probability maximum achievable gain field shape avalanche shape charging up properties
Simulations: basics Simulation ANSYS PACKAGE GARFIELD PACKAGE Ansys is used to define: the geometry; the material properties; the electrodes voltage; the e.m. boundary conditions; and to solve the e.m. equations with a finite elements analysis method GARFIELD PACKAGE Garfield is used to: read the Ansys fieldmaps; define the gas properties; simulate the behavior of electrons in the gas
ANSYS(1): definition of the geometry Geometrical properties: kapton thickness = 50 µm copper thickness = 5 µm drift gap thickness = 800 µm induction gap thickness = 800 µm holes pitch = 140 µm hole smaller diameter = 55 µm hole larger diameter = 55 µm 95 µm In order to speed up the simulation, only the elementary cell has been considered the mesh density has been doubled on all the gas boundary surfaces
ANSYS(2): definition of the voltages cathode 1MΩ GEM 1 top 0.5MΩ In the chamber: conversion gap = 3 mm transfer gap = 2 mm induction gap = 2 mm Therefore, the field values in the chamber are: drift field = 2.667 kV/cm induction field = 4 kV/cm GEM voltage ≈ 366.7 V I ≈ 800 µA GEM 1 bottom 1MΩ GEM 2 top 0.5MΩ 5MΩ GEM 2 bottom 1MΩ GEM 3 top 0.5MΩ 2.5MΩ GEM 3 bottom 1MΩ anode to GND
GARFIELD(1): field and electrons drift
GARFIELD(2): field 95-55 85-55 75-55 65-55 55-55 55-65 55-75 55-85 55-95
GARFIELD(3): electron drift 95-55 85-55 75-55 65-55 55-55 55-65 55-75 55-85 55-95
GARFIELD(4): electron drift & diffusion Finally, the electron diffusion is implemented in the Garfield code a Monte-Carlo technique is used to simulate the longitudinal and transversal diffusion processes the Monte-Carlo integration step is set much smaller than the typical detector dimensions (good compromise = 250 nm)
GARFIELD(5): electron drift & diffusion 55-55 95-55 55-95
Preliminary conclusions Moving from the open-top geometry (95-55) to the cylindrical geometry (55-55) and then to the open-bottom geometry (55-95): the field peak @z=-25µm decreases, while the field peak @z=+25µm increases; if the thermal electron diffusion is switched off, the electron transparency decreases from 95-55 to 55-55, then it increases slightly; if the diffusion is off, all the stopped electrons end up on the upper copper surface not a meshing problem! if the diffusion is off, the diameter of the outcoming electron beam decreases from 95-55 to 55-55, then is remains constant; the Monte-Carlo diffusion technique seems to work fine is there a real need for a microscopic diffusion procedure?
implementation of the avalanche process (Monte-Carlo or microscopic?) Outlooks check the behavior of a microscopic diffusion process and compare the results with the Monte-Carlo method; electron transparency study using electrons from random coordinates on a “far” plane (70 µm above the upper copper foil); implementation of the avalanche process (Monte-Carlo or microscopic?) charging up studies