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Low Temperature X-ray Detectors. Caroline K. Stahle NASA / Goddard Space Flight Center. Outline :. Motivation for low temperature x-ray detectors The two approaches to “non-dispersive” spectroscopy Superconducting tunnel junctions for the x-ray regime
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Low Temperature X-ray Detectors Caroline K. Stahle NASA / Goddard Space Flight Center
Outline: • Motivation for low temperature x-ray detectors • The two approaches to “non-dispersive” spectroscopy • Superconducting tunnel junctions for the x-ray regime • Micro-calorimeters and their operating principles • resistive thermometers • magnetic thermometers • Cooling • LTDs and x-ray astronomy: past, present, and future • Summary and comparisons
Motivation:high resolution with a non-dispersive x-ray spectrometer • The 0.1 – 10 keV x-ray band corresponds to temperatures from 106 to108 K. At these temperatures the dominant radiation is collisionally-excited characteristic lines of partially ionized heavy elements. These lines provide a wealth of diagnostics on the elemental abundances and physical conditions in the gas, and measurements of Doppler shifts and line widths can give valuable information about the motion. • The good energy resolution of grating spectrometers requires optics with very high angular resolution, but the design of x-ray telescopes involves a trade-off between angular resolution and collecting area, tending to put gratings at a sensitivity disadvantage. • Gratings multiplex by dispersing the spectrum across a position sensitive detector, but at the expense of confusion in spectra from spatially extended objects.
Now, a pretty basic question: How can we directly measure the energy of an x-ray photon? We can do either an equilibrium or a non-equilibrium measurement.
Non-equilibrium: • Absorbed energy goes into quantized excitations. • Each excitation has energy much greater than kT. • These excitations are then counted to determine the energy. • Since, invariably, some of the energy goes elsewhere, such as into heat, the ultimate energy resolution is determined by the statistics governing the partition of energy between the system of excited states and everything else. • This is how most photon and particle detectors work. • In order to improve the measurement statistics, a large number of excitation quanta is required. • This, in turn, requires low temperature operation.
Equilibrium: • The energy is deposited in an isolated thermal mass. • The resulting increase in temperature is measured. • At the time of the measurement, all of the deposited energy has become heat and the sensor is in thermal equilibrium. • The ultimate energy resolution is determined by how well one can measure this change in temperature against a background of thermodynamically unavoidable temperature fluctuations. • This is calorimetry. • Low temperature operation is required in order to minimize these thermodynamic energy fluctuations.
Superconducting Tunnel Junctions (STJ) • Excitations from the superconducting ground state are called quasiparticles. • The gap between the ground state and the lowest excited states is ~1 meV for many superconductors. • Compared with a semiconductor with bandgap ~ 1 eV, a superconducting non-equilibrium energy sensor should provide much higher energy resolution, provided the temperature is low enough to render thermal excitation of the quasiparticles improbable. • The most efficient way to measure the quasiparticle density is through measuring the quasiparticle tunneling current from the absorbing superconductor through an insulating barrier to a superconducting collection electrode. The Josephson pair tunneling current must be suppressed by a magnetic field.
STJ schematic and array S. Friedrich -- LLNL
Limiting Energy Resolution for a Tunnel Junction: Fano limit (no quasiparticle multiplication) Backtunneling limit (where F~ 0.2 is the Fano factor and <n> is the average backtunneling multiplier)
Yale STJ Imager One can achieve position resolution comparable to energy resolution, since we determine position from the charge division. D. Prober
Calorimetry is OLD! About 150 years ago, James Joule and Julius von Mayer independently determined that HEAT = ENERGY, and calorimetry was born. But, only about 19 years ago, the power of performing calorimetric measurements at very low temperatures (< 0.1 K) was realized, independently, by Harvey Moseley and by Etorre Fiorini and Tapio Niinikoski. This is called MICROCALORIMETRY, or occasionally QUANTUM CALORIMETRY, because of its ability to measure the energy of individual photons or particles with high sensitivity.
Calorimeters Some thermometers: •resistive • capacitive • inductive •paramagnetic • electron tunneling • thermoelectric
Basic calorimeter requirements: • Low temperature • Sensitive thermometer • Thermal link weak enough that the time for restoration of the base temperature is the slowest time constant in the system yet not so weak that the device is made too slow to handle the incident flux. • Absorber with high cross section yet low heat capacity • Reproducible and efficient thermalization
Thermal fluctuation noise = Signal Phonon noise
Signal (with thermalization time) Phonon noise White noise
How well can a microcalorimeter measure energy? To answer this question, we need to specify the kind of thermometer. The best energy resolution, so far, has been obtained with resistor-based calorimeters, both semiconductor thermistors (the pioneering technology) and superconducting transition-edge sensors. dT ––> dR Sensitivity a = d log R / d log T Considerations for resistive thermometers: • All resistors have Johnson noise. • In order to measure the change in resistance as a change in current or voltage, the sensor must be electrically biased, resulting in Joule heating.
Moseley, Mather, and McCammon (1984) worked out the ultimate energy resolution attainable with an ideal resistor-based microcalorimeter. We can understand the basic dependencies simply by understanding how the signal-to-noise and bandwidth change with a, T, and C. This looks a lot like the RMS thermal fluctuation noise! But note, there is no reason why x can’t be < 1!
Electrothermal Feedback PJoule = I2R(T) = V2/R(T) For dP/dT < 0 (negative feedback): if dR/dT < 0, we want (nearly) constant current bias. if dR/dT > 0, we want (nearly) constant voltage bias. Negative electrothermal feedback literally speeds up the cooling of a microcalorimeter after an impulse of energy. For sensitive thermistors (large |a|), this can be a very important effect. It doesn’t change the signal-to-noise anywhere, but it does permit pushing the pulse decay times up against the limiting thermalization time, making most efficient use of the available bandwidth.
Semiconductor thermistors: • ion-implanted Si and neutron transmutation doped (NTD) Ge • doped within the metal-insulator transition • conduction proceeds via thermally activated jumps of isolated charge carriers between impurity levels. The mechanism is called variable range hopping (VRH). The average hopping distance increases as the temperature is lowered, as it becomes more probable for an electron to tunnel further to a site requiring less change in energy than to tunnel to a nearby site with a difference in energy large compared to that available in the spectrum of phonons. In doped crystalline semiconductors, which have a Coulomb gap in the density of states, VRH produces the resistance law:
Absorbers for use with semiconductor thermistors: • low heat capacity (< 0.1 pJ/K if limited to a< 6 and needing few eV resolution) • high Z constituents (for X-ray opacity) • good thermalization Insulators and semiconductors impurity levels in their bandgaps on which electrons can become trapped before thermalizing, leading to incomplete and noisy thermalization Normal metals thermalize well, but the electronic specific heat is prohibitive Narrow gap semiconductors / semimetals (HgTe) thermalize well, but have low Debye temperatures (high specific heat) High Z superconductors poor thermalization in superconductors with high Debye temperatures HgTe and Sn have been good compromises.
State of the art in NTD-based x-ray calorimeters: Milan: Sn absorber SAO: Comparable results with similar materials Single devices and small (e.g 4-pixel) arrays. Microlithographic processes available for arraying in Si not yet developed for NTD Ge.
State of the art in astrophysical instrumentation using x-ray calorimeter arrays: XRS (Astro-E) and XQC (sounding rocket): Micromachined arrays of ion-implanted Si with HgTe absorbers optimized for the 0.3 - 10 keV and < 1 keV x-ray bands respectively • Goddard 36-pixel array flown on Wisconsin/GSFC XQC sounding rocket experiment, had an energy resolution ranging from 5 to about 12 eV over the 0.05 - 1 keV band. • Goddard 32-pixel XRS array: 8-9 eV at low energies and 11-12 eV at 6 keV. (more about both of these later….)
The dominant noise term in the XRS devices is excess 1/f noise that prevents the realization of the theoretical performance; however, preliminary results from experiments with a novel fabrication technique indicate that it will soon be possible to combine the advantages of working with silicon for array fabrication with the uniform doping and lower excess noise associated with the NTD thermistors. Diffusing implanted dopants confined in a “silicon-on-insulator” layer has already yielded deeper and more uniform implant density than had previously been possible, and this has resulted in the elimination of the excess noise term. Preliminary data indicated that it should be possible to make an XRS-style array with no worse than 9 eV resolution at 6 keV, and possibly as good as 4 eV. Stay tuned: we may be able qualify this technology in time for XRS-2!
Superconducting Transition-Edge Sensors in Calorimeters What causes the resistance in the transition? • thermal gradient leads to “phase separation” OR • flux flow (e.g. nucleation of phase-slip lines)
TES thermometers provide ~100 times more sensitivity than practical semiconductor thermistors. • Increase a, increase the measurement bandwidth. • Except, this a is only good over a small temperature range. • We need to increase C to stay within the transition. This C is set by a and the required saturation energy. C = E/dT ~ aE/T • Thus we can no longer improve resolution by increasing sensitivity. • For 6 keV x-rays, the predicted resolution works out to be nearly the same as that originally anticipated for semiconductor calorimeters (that is, a few eV). • But the large heat capacity budget eases absorber selection and has other practical advantages. • And the large a, through electrothermal feedback, permits the falltime to be shortened to match the measurement bandwidth, reducing pile-up • For lower saturation energies, such as for an optical detector, the full advantage of the higher sensitivity can be exploited
120 100 Instrument Resolution: 2.0 0.1 eV FWHM Al Ka1,2 80 Counts per 0.25 eV bin 450 counts/sec 60 40 Al Ka3,4 20 0 1480 1485 1490 1495 1500 1505 Bismuth absorber Energy (eV) TES Al/Ag bilayer K. Irwin
FWHM = 3.9 eV SRON Ti/Au TES with Cu absorber, 3.9 eV FWHM, 100 ms time constant, 5 minute acquisition time. Line broadens to 4.5 eV FWHM for 30 minute acquisition. H. Hoevers - SRON
K Ka into 500 x 500 micron TES Goddard Mo/Au TES: 2.4 +/- 0.2 eV at 1.5 keV and 3.7 +/- 0.2 eV at 3.3 keV. Al Ka into 300 x 300 micron TES
Thermometers not based on changing resistance: • no dissipation, but also no electrothermal feedback • no Johnson noise tied directly to the thermometric property of the sensor Paramagnetic calorimeters(< 1eV resolution at 6 keV predicted) • spin system of isolated ions of d and f transition elements in a non-magnetic matrix. • in a weak magnetic field there exists a small Zeeman splitting between the spin-up and spin-down energy states, thus atemperature change results in a change in magnetization, which can be sensed by a SQUID • because the sensitivity increases with the heat capacity of the spin system, the predicted resolution of an optimized magnetic calorimeter degrades more slowly with heat capacity than resistive calorimeters • What ends up being the bandwidth limiting noise without Johnson noise? SQUID noise, pick-up from Johnson noise currents in absorber and nearby metal, phonon noise between weakly coupled systems
Au:Er Heidelberg/Brown 13 eV FWHM at 5.9 keV
Position Sensing Calorimeter Segmented metallic absorbers between Mo/Au TES sensors • For x-ray applications, the energy resolution required is 10-100 times higher than the spatial resolution required. In that context, it doesn’t make sense to squander energy resolution on unnecessary position resolution. • Thus we want to confine the position information to only a small slice of the bandwidth at high frequencies. Both sensors ultimately measure the same temperature increase, but they experience different thermalization delays.
So, how cold do we need to go? It depends on the detector technology, but basically the 10 mK to 100 mK range. XRS and XQC have heat sink temperatures of 65 mK. The Constellation-X baseline is 50 mK. How do you get that cold on a satellite? The most straightforward way is to use an adiabatic demagnetization refrigerator (ADR).
The XRS on-orbit duty cycle was expected to be 97% (1 hour for recharge needed every 36 hours). Some Constellation-X designs include multi-stage ADRs that switch between salt pills to provide continuous cooling. In XRS, the discharge thermal sink is provided by liquid helium (pumped by the vacuum of space). A guard dewar of solid neon extends the lifetime of this helium.
Low temperature detectors and x-ray astronomy: XQC – 1996, 1999, … XRS – launch failure in 2000, reflight in 2005 32 pixel calorimeter array Constellation-X – 2010 32 x 32 pixel calorimeter array XEUS – 2015? calorimeters or STJ Undoubtedly others in between, to be defined…
• Goddard 32-pixelXRSarray: • 8 - 9 eV baseline and low energies • 9 - 10 eV at 3.3 keV • 11 - 12 eV at 5.9 keV
Laboratory Astrophysics with XRS Hardware Engineering Model XRS detector system incorporated into compact laboratory ADR dewar Microcalorimeter connected to EBIT at the Lawrence Livermore National Laboratory Basic atomic physics measurements. Application of XRS under real conditions of complex, time-dependent spectra.
Creating an Ionized Plasma with EBIT Every 5 seconds, slightly ionized atoms (+1, +2) are injected into the trap. Once there, these atoms are further ionized by the EBIT electron beam toward an equilibrium state determined by the beam energy. 5 sec 0.2 sec
Laboratory Astrophysics using Microcalorimeter EBIT - Fe ions Calorimeter signal signal Calorimeter signal
Simulating Thermal Plasmas with EBIT Beam Energy (keV) Time (ms) • Vary electron beam energy as a function of time so that it time averages out to a Maxwellian energy distribution with a specified <kT>. • The sweep cycle is faster than ionization and recombination timescales. We repeat the cycle many times over a period of several seconds. • We have completed a first survey from <kT>=0.5 keV to 3 keV Energy (keV)
Summary and comparisons: • Low temperature detectors are being developed for imaging spectroscopy. • The choice of detector for a given application depends on the measurement priorities. Calorimeters will tend towards higher resolution. Non-calorimetric devices will tend towards higher speeds. Beyond that very generic (and not particularly useful) statement, the suitability of a detector comes down to how well it can actually be implemented with real materials and real read-out electronics in a practical cryostat. • Detector concepts may fall out of favor, and new ideas may gain popularity, but sensitive energy resolving detectors will always require LOW TEMPERATURES. Thus, we need cold detectors to study the hot universe.
