Longitudinal stacking and electron cooling of ion beams in the ESR as a proof of principle for FAIR C. Dimopoulou B. Franzke, T. Katayama, D. Möhl, G. Schreiber, M. Steck DESY Seminar, 20 November 2007
Overview Motivation: Stacking of Rare Isotopes in the NESR @FAIR Cooling-stacking experiments in the ESR: Long. accumulation with Barrier Buckets Long. accumulation with the sinusoidal RF at h=1 Conclusions & Outlook
FAIR Facility for RIBs and pbars UNILAC SIS18 p Linac SIS100 RIBs pbars Ion sources pbar target SuperFRS low-energy exp. area CR/ RESR NESR
The FAIR 13 Tm storage rings RIBs to CR pbars to CR stable ions to NESR e- linac to low energy complex FLAIR (ions, pbars) CR pbar and RIB stochastic pre-cooling RESR pbar accumulation (RIB deceleration) ER NESR pbar and ion deceleration experiments with stored ions
NESR Operation with ions to low energy complex C=222.11 m max.bρ =13 Tm max. A/q=2.7 UHV 10-11 mbar Ions (Stable & Rare Isotopes) injection at 100-740 MeV/u storage and e-cooling in the range 740 4 MeV/u (max. decel. rate 1 T/s) RIB accumulation at injection energy assisted by electron cooling momentum acceptance (ε H =0): ±2.1 % transverse accep. H/V ( p/p= ±1.5%): 160 / 50 mm mrad Experiments experiments with internal target electron target (2nd electron cooler) laser interactions (cooling, spectroscopy) collider mode with electrons/pbar
NESR Operation with antiprotons to low energy complex C=222.11 m max.bρ =13 Tm max. A/q=2.7 UHV 10-11 mbar momentum acceptance (ε H =0): ±2.1 % transverse accep. H/V ( p/p= ±1.5%): 160 / 50 mm mrad Antiprotons deceleration 3000 800 30 MeV electron cooling at 800 MeV
The NESR Electron Cooler Ions design by BINP, Novosibirsk e - e - Cooler Parameters energy 2-450 kev max. current 2 A cathode radius 1 cm beam radius 0.5-1.4 cm hollow cathode option magnetic field gun up to 0.4 T cool. sect. up to 0.2 T straightness 5 10-5 adiabatic expansion option Issues: high voltage up to 500 kv fast ramping, up to 250 kv/s magnetic field quality cool. section length 5 m max. power in collector 15 kw vacuum 10-11 mbar
Principle of electron cooling Cooling rate 1 τ cool 2 q A n el 3 5 β γ θ c 3 rel
Storage ring with beam cooling beam noise power (arb. units) 3 2 1 0 Transverse Longitudinal 4 Before After revolution frequency Electron cooling Increase phase space density Accumulation of ions Compensate diffusion (phase space growth) during deceleration Counteract heating effects i.e. in targets
Accumulation of RIBs at injection energy Why? Increase the intensity of RIBs for internal experiments; in particular to reach high luminosity in the e-ion collider mode. How? Longitudinal beam compression at injection energy (i.e. at 100-740 MeV/u) supported by electron cooling i) using Barrier Bucket pulses i) by multiple injections on the unstable fixed point of the sinusoidal RF bucket at h=1 Goal Stacking cycle time (between 2 successive injections) < 2 sec: limitations by RIB lifetimes profit from SIS100 cycle time of 1.5 sec
Accumulation of RIBs at injection energy Stacking by multiple injections on the unstable fixed point of the RF bucket at h=1 (D. Möhl) ECOOL always ON. Sketch of the stationary h=1 bucket, its inner trajectory covering 10% of the circumference containing the stack, and kicker waveform to inject the new batch. Procedure: 1. Increase RF voltage adiabatically to bunch the stack over a small part of the ring. 2. Inject new batch on the free part of the circumference i.e. on the unstable fixed point. 3. Decrease RF (non-adiabatically so as not to dilute the new bunch) to debunch and merge new batch and stack.
Proof of principle by experiments in the ESR The existing GSI accelerator complex ion sources Unilac SIS18 All ions from H to U: 4x10 9 1 GeV/u U 73+ 5x10 10 1 GeV/u Ar 18+ ESR
Proof of principle by experiments in the ESR 40 Ar 18+ at Ec=65.3 MeV/u (β=0.356, γ=1.07, T rev 1 µs) SIS (C=216m) h=2 f rev ~0.5 MHz 1 of the 2 bunches ~300 ns (FWHM) f rf = 1 MHz Synchronised SIS & ESR RF ESR (C=108 m) h=1 f rev ~1 MHz Barrier Buckets or sine pulse ±170 V max. Successive injections of bunches from SIS (~10 7 ions, ~300 ns long) to accumulate up to a few times 10 8 ions in ESR. For injected beam: e-cooling time to equilibrium ~ 13 s at I e =0.1 A (// from Schottky pickup; hor. from rest gas monitor) Tested both schemes under same conditions!
τ Stacked beam in ESR In the cooling section: 2 main competing processes Cooling rate Equilibrium IBS heating rate 2 4 1 q n el 1 1 c q N = i 3 5 3 τ 2 3 4 cool A β γ θ rel cool τ IBS 1 τ IBS A β γ ε H ε V ( p/p)
Stacked beam in ESR Stacked coasting beam at equilibrium between cooling & IBS: N i = 10 8 (I ESR = 0.3 ma), Ie=0.1 A ( p/p) equil = 1 10-4, ε h,equil 1 mm mrad ( p/p) equil (2 σ) 10-4 ε H,equil (2 σ), m rad 10-6 10-5 10 7 10 8 10 9 N i stack 10-7 10 7 10 8 10 9 N i stack Scaling laws: ( p/p)equil ~ (N i /B) 0.36 Ie -0.3 (ε h,v )equil ~ (N i /B) 0.41 Ie -0.3 Bunching factor: B=T bunch(stack) /T rev
Stacking with Barrier Buckets Beam signal in the ESR PU (1 frame/ 200 revolutions for a total time of 1.46 s) 40 Ar 18+ @ 65.3 MeV/u V BB =120 V, T B =200 ns (f rf =5 MHz), I e =0.1 A End adiab. debunching 1.5 s Start adiab. debunching 1.25 s ~1.2 s injection End moving 0.85 s Gap adiabatic moving Start moving 0.35 s End adiab. bunching 0.25 s Start adiab. bunching t=0 T rev =1 µs
Stacking with Barrier Buckets V BB =20 V, T B =200 ns (f rf =5 MHz), I e =0.1 A 1.5 s 1.25 s ~1.2 s injection 0.85 s 0.35 s 0.25 s t=0 T rev =1 µs
Stacking with Barrier Buckets:Timing V BB =120 V, T B =200 ns (f rf =5 MHz), I e =0.1 A, stacking cycle=9 s PU signals, arb. units 4 2 0-2 -4 Differentiated kicker pulse ESR stack SIS bunches time-uncorrelated signals, not corrected for cable delays 1 2 3 4 5 6 7 8 9 t, µs Injection kicker pulse: total ~500 ns SIS bunch length: 300-350 ns(fwhm) ESR stack length: T stack = 400 ns (75% of uniform distribution)
Stacking with Barrier Buckets:Timing ESR Stack with freshly injected bunch in the Barrier Bucket gap 0.8 ESR PU signal, arb. units 0.6 0.4 0.2 0.0-0.2 T rev =1 µs -0.4 5.9 6.0 6.1 6.2 6.3 6.4 6.5 6.6 6.7 6.8 6.9 t, µs
Stacking with Barrier Buckets Beam accumulation measured by the ESR current transformer V BB =120 V, T B =200 ns (f rf =5 MHz), I e =0.1 A, stacking cycle=9 s Stacked ESR current (ma) 1.5 1.0 0.5 0.0 0 10 20 30 40 50 60 70 80 90 100 t (s) ESR current increase/ injected current 1.0 Accumulation efficiency 0.8 0.6 0.4 0.2 0.0-0.2 0 10 20 30 40 50 60 70 80 90 100 t (s)
Stacking with Barrier Buckets I ESR at saturation (ma) 2.0 1.8 1.6 1.4 1.2 1.0 0.8 0.6 0.4 0.2 V BB =120 V, T B =200ns, δ B = 2.79 10-4 V BB =50 V, T B =200ns, δ B = 1.80 10-4 V BB =25 V, T B =200ns, δ B = 1.27 10-4 V BB =30 V, T B =300ns, δ B = 1.71 10-4 0.0 0.0 0.1 0.2 0.3 0.4 0.5 I e (A) δ B RF bucket height: ±δ B = 2 πβ Qe V rf V T 2 rf B η h E0, tot h=t rev /T B 5 What is the p/p of the stack at saturation intensity? Results of BB stacking-cooling simulations by T. Katayama
Stacking with Barrier Buckets Estimation assuming equilibrium between cooling and IBS in saturated stack: p/p ~ (I ESR,sat / B) 0.36 I e -0.3, B=T stack /T rev =0.4 Equilibrium p/p (2 σ) of stack for the measured saturation intensity 3.0x10-4 2.5x10-4 2.0x10-4 1.5x10-4 I e =0.1 A I e =0.3 A I e =0.5 A 1.0x10-4 1.0x10-4 1.5x10-4 2.0x10-4 2.5x10-4 3.0x10-4 Available RF bucket height δ B
Stacking with sinusoidal RF at h=1 V rf =60 V, f rf =1 MHz, I e =0.5 A, stacking cycle=9 s 0.4 PU signals, arb. units 0.2 0.0-0.2 SIS bunches ESR stacked bunch 3.0 3.5 4.0 4.5 5.0 5.5 time-uncorrelated signals, t, µs not corrected for cable delays
Stacking with sinusoidal RF at h=1 V rf =60 V, f rf =1 MHz, I e =0.5 A, stacking cycle=9 s 0,6 PU signals, arb. units 0,4 0,2 0,0 ESR stacked bunch FWHM~180 ns SIS bunch FWHM~300 ns Qualitative information: relative phase of stacked bunch, new bunch & kicker pulse w.r.t. separatrix -0,2 4,4 4,6 4,8 5,0 5,2 5,4 5,6 5,8 t, µs Kicker pulse
Stacking with sinusoidal RF at h=1 Beam accumulation measured with the ESR current transformer V RF =120 V, f rf =1 MHz, I e =0.1 A stacking cycle=9 s Stacked ESR current (ma) 2.0 1.5 1.0 0.5 (injected current varied within 30%) 0.0 0 10 20 30 40 50 60 70 80 90 100 t (s) Problems: Imperfect synchronisation RF-kicker, variable kicker pulse length Adiabatic bunching (~0.25 s) fast w.r.t. e-cooling ESR current increase/ injected current Accumulation efficiency 1.0 (injected current varied within 30%) 0.8 0.6 0.4 0.2 0.0-0.2 0 10 20 30 40 50 60 70 80 90 100 t (s) Stack losses after every injection
Stacking with sinusoidal RF at h=1 Beam accumulation measured with the ESR current transformer V RF =120 V, f rf =1 MHz, I e =0.1 A stacking cycle=5 s Stacked ESR current (ma) 1.4 1.2 1.0 0.8 0.6 0.4 0.2 I e =0.2 A I e =0.1 A 0.0 0 5 10 15 20 25 30 35 40 t (s)
Stacking with sinusoidal RF at h=1 I ESR at saturation (ma) 1.8 1.6 1.4 1.2 1.0 0.8 0.6 0.4 0.2 Vrf = 120 V, δ B = 6.28 10-4 Vrf = 60 V, δ B = 4.44 10-4 Vrf = 30 V, δ B = 3.14 10-4 0.0 0.0 0.1 0.2 0.3 0.4 0.5 I e (A) The p/p of the stack at saturation intensity is given from the RF bucket formula if we measure with the pickup 2 σ E t σ β η s 0, tot p the corresponding bunch length! = = T C 2π Qe hv p rev RF bucket height: ±δ B δ = B 2 Qe rf V rf 2 πβ η h E h=1 0, tot
Stacking with sinusoidal RF at h=1 Vrf (V) Stacked bunch length at saturation measured with the pickup, for different RF voltages and electron currents. I ESR at saturation (ma) bunch length of stack (FWHM) p/p of stack (FWHM) Bucket height +/- δ B B=T stack /T rev 120 1.2-1.4 160 ns 3.10 10-4 6.28 10-4 0.157 60 0.9-1.0 175 ns 2.40 10-4 4.44 10-4 0.172 30 0.7 200 ns 1.94 10-4 3.14 10-4 0.197 At saturation, the stacked bunch occupied ~20% of the ring and filled 50-60% of the momentum acceptance of the RF bucket at h=1, for all applied voltages. Within the pickup resolution (~10 ns): bunch length independent of I e.
Stacking with sinusoidal RF at h=1 6.0x10-4 4.0x10-4 2.0x10-4 I e =0.1, 0.3, 0.5 A Equilibrium p/p (2 σ) of stack for the measured saturation intensity 0.0 0.0 2.0x10-4 4.0x10-4 6.0x10-4 Available RF bucket height δ B
Conclusions Both long. stacking methods with cooling successfully tested in the ESR proof of principle for RIBs in NESR Procedure and results essentially understood. Accumulated intensity limited by (i) the available RF voltage i.e. bucket area and (ii) by the electron cooling strength. Accumulation speed limited mainly by electron cooling strength. Long kicker pulse w.r.t. revolution period restricted flexibility in stack/bunch/bb length manipulations.
Conclusions (continued) Not optimal h=1 stacking,dedicated experiment planned (''cleaner'' RF & kicker conditions, long kicker pulse for high injection efficiency, longer bunching & stacking cycles to allow better cooling, synchronisation RF-cooler during bunching) For the same Vrf, stacking at h=1 offers T confinement strength than stacking with BB. Trev B larger Easier to deduce stack parameters for stacking at h=1, dedicated simulations necessary for stacking with BB.
Outlook for the NESR The exp. results in the ESR confirm the requirements for the NESR systems: Faster cooling foreseen (higher & variable electron beam density) stacking cycles below 2 s (RIBs lifetime, SIS100 cycle) Barrier Bucket RF system with max. voltage of +/-2 kv at 5 MHz Short adjustable (~100 ns) injection kicker flat top and rise/fall times essential for stacking Appropriate & sufficient beam diagnostics
NESR Civil Construction Planning Lower (ring) level Upper level rf, diagnostics, vacuum, controls power converters, common systems Integration of technical components and experiments underway
References C. Dimopoulou, K. Beckert, P. Beller, A. Dolinskii, U. Laier, F. Nolden, G. Schreiber, M. Steck, J. Yang, Phys. Rev. ST-AB 10 (020107) 2007. FAIR Baseline Technical Report, http://www.gsi.de/fair/reports/. C. Dimopoulou et al.,proccedings of COOL07 T. Katayama et al., Proccedings of COOL07, (to be published on JACoW : http://accelconf.web.cern.ch) M. Steck et al., Proceedings of EPAC 06, published on JACoW V.V. Parkhomchuk et al.,gsi-acc-report-2005-04-001