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This study explores the time-dependent behavior of active galactic nuclei using the leptonic and hadronic models. It investigates the effects of proton injection, proton energy losses, and proton escape on the observed spectrum. The study also examines the interactions of protons with photon fields and presents a one-zone model for further analysis.
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THE TIME-DEPENDENT HADRONIC MODELOF ACTIVE GALACTIC NUCLEI A. Mastichiadis University of Athens
...in collaboration with • Stavros Dimitrakoudis – UoA • Maria Petropoulou – UoA • Ray Protheroe – University of Adelaide • Anita Reimer – University of Innsbruck
THE LEPTONIC MODEL FOR H.E. EMISSION… Log Ν Active Region aka The Blob: Relativistic Electrons Log γ B-field soft photons synchrotron inverse compton
… THE HADRONIC MODEL… Proton distribution Log Ν Active Region aka The Blob: Relativistic Electrons and Protons Gamma-rays from proton induced radiation mechanisms Log γ synchrotron
… A RELATED PROBLEM… Particle distribution Usual approach: Fit MW spectrum using particle distribution function N(γ) (parti-cles/volume/energy) Log Ν γ-p γmin γmax Define energy limits, power law slopes, breaks use emissivities to calculate radiated spectrum. Log γ Advantages: Simple – One-step process Textbook approach e.g. ‘Compton catastrophe’ of leptonic plasmas: if UB<Usyn and losses are not taken into account photon population exponentiates in the source Disadvantages: It does not take particle losses into account Can be (very) misleading
…AND A WAY OUT Particle losses + radiation In: Particle Luminosity Out: Photon Luminosity Particle distribution function Slow radiative losses: Output Luminosity << Input Luminosity Low efficiency Injected particles not ‘burned’ Accumulation + high particle energy density Fast radiative losses: Output Luminosity ~ Input Luminosity High efficiency Injected particles ‘burned’ Low particle energy density LEPTONIC PLASMAS HADRONIC PLASMAS
PROTON INJECTION PROTON DISTRIBUTION FUNCTION PROTON LOSSES PROTON ESCAPE ELECTRONS- POSITRONS PHOTONS Leptonic processes OBSERVED SPECTRUM
Protons: Electrons: losses escape injection Photons: Neutrinos: injection Bethe-Heitler proton ssa Neutrons: synchrotron γγ synchrotron photopion annihilation triplet pair production
INTERACTIONS OF PROTONS WITH PHOTON FIELDS photopair production (Bethe-Heitler) • Secondary distribution functions Protheroe & Johnson 1996 • Modeling of proton energy losses in AM et al 2005 photomeson production • Secondary distribution functions SOPHIA code (Muecke et al 2000) • Modeling of proton energy losses In Dimitrakoudis et al 2012
APPLICATION: ONE ZONE MODELS • Source of radius R containing magnetic field B. • Monoenergetic proton injection at Lorentz factor γp with luminosity Lp and characteristic escape time from the source tp,esc • System of four coupled P.I.D.E. Study its properties. • Keep free parameters at minimum: No external photons/no electron injection. Simplest case solution: • If tp,loss>>tcr=R/c injected protons accumulate at the source energy density up =(Lp /V) tp,esc. • The system is characterized by a critical energy density up,cr(γp,B,R): • If up <up,cr(γp,B,R) system in linear (subcritical) regime. • If up >up,cr(γp,B,R) system in non-linear (supercritical) regime. If system in linear regime: model fits with ‘ready’ distribution function is o.k. Problem: this is not known a priori.
LINEAR REGIME: SECONDARYELECTRONS AND PHOTON SPECTRA photons electrons photopion electrons 8 orders of magnitude X-rays to TeV Bethe-Heitler electrons γγ electrons R=3e16cm B = 1 G γp =2e6 lp= 0.4 tp,esc=tcr S. Dimitrakoudis et al., 2012
VARIABILITY I - QUADRATIC In linear regime quadratic • For certain γp -B choices • p-synchrotron serve as targets • for both photopair and photopion • quadratic behavior between p-syn and photopair + photopion synchrotron analogous to syn – SSC of lepto- nic plasmas p-syn photo- meson Dimitrakoudis et al. 2012 Lorentzian variation in proton luminosity
VARIABILITY II - CUBIC In linear regime see poster P6-06 S. Dimitrakoudis cubic p-syn photo- meson For other γp- B choices p-synchrotron serve as targets only for photopair (photomeson below threshold) cubic behavior between p-syn and photomeson. Lorentzian variation in proton luminosity
PROTON SUPERCRITICALITIES If up>up,cr system undergoes a phase transition and becomes supercritical Log Photon Luminosity subcritical supercritical ~3.5 orders of magnitude onset of supercriticality r ~0.01 orders of magnitude linear quadratic quadratic Proton injected luminosity is increased by a factor 3 log lp Log Proton Luminosity
SEARCHING FOR THE CRITICAL DENSITY B=10 G R=3e16 cm SUPERCRITICAL REGIME I SUBRCRITICAL REGIME In all casesthe proton injection luminosity is increased by 1.25 corresponding photons increase by several orders of magnitude Time-dependent transition of photon spectra from the subcritical to the supercritical regime
A ZOO OF PROTON SUPERCRITICALITIES • When up>up,cr various feedback • loops start operating • Spontaneous soft-photon • outgrowth leading to • substantial proton losses. • Feedback Loops • Pair Production – Synchrotron Loop (Kirk & AM 1992) • Automatic Photon Quenching (Stawarz & Kirk 2007; Petropoulou & AM 2011). Probably there are more. Each loop has its own modus operandi. Parameters similar to the ones used for blazar modeling For γp>> up,cr ~ uB B=10 G R=3e16 cm SUPERCRITICAL REGIME PPS Loop quenching- πγ induced cascade quenching- BH induced cascade SUBCRITICALREGIME
DYNAMICAL BEHAVIOUR IN THE SUPERCRITICAL REGIME protons • If up>up,cr exponential growth of soft photons. • Subsequent behavior: • If tp,esc<Tc system reaches quickly a steady state characterized by high efficiency. • If tp,esc>Tc system exhibits limit cycles or damped oscillations. -- see also numerical work of Stern, Svensson, Sikora (90s) and Kirk & AM (90s -00s) photons time Photon density Proton density
ANALYTIC APPROACH TO A SIMPLIFIED HADRONIC SYSTEM • 2 (in subcritical) or 3 (in supercritical) populations: • Relativistic protons • ‘Hard’ photons (from π-interactions) • ‘Soft’ photons (from quenching) Retains the dynamical behavior of the full system Limit cycles or damped oscillations as it enters the supercritical regime M. Petropoulou & AM 2012
AN APPLICATION: THE CASE OF 3C 279 Petropoulou & AM 2012b • Hadronic fitting to the TeV MAGIC observations of 3C 279. • If the proton luminosity is high • System becomes supercritical • spontaneously produced soft photons violate the X-ray limits. • Fit only possible for low proton luminosity high Doppler factor δ>20. log δmin See Maria’s poster P2-10 δ~20 log B
TIME-DEPENDENT EXCURSIONS INTO THE SUPERCRITICAL REGIME • Perturb system from steady-state in the linear regime Lorentzian in proton injection. • Proton energy is burned into flaring episodes of varying amplitude. PRELIMINARY photon output proton input
CONCLUSIONS • One-zone hadronic model • Accurate secondary injection (photopion + Bethe Heitler) • Time dependent - energy conserving PIDE scheme • Four non-linear PIDE – c.f. leptonic models have only two First results of pure hadronic injection • In subcritical regime: - Low efficiencies - Quadratic and cubic time-behavior of radiation from secondaries • In supercritical regime: - High efficiencies / Burst type of behavior - Parameters relevant to AGNs and GRBs - Warning to modelers: The supercriticalities exclude sections of parameter-space used for modeling these sources
