Marco Bruni, ICG, University of Portsmouth & Dipartimento di Fisica, Roma ``Tor Vergata” Paris 8/12/05 Dark energy from a quadratic equation of state Marco Bruni ICG, Portsmouth & Dipartimento di Fisica, Tor Vergata (Rome) & Kishore Ananda ICG, Portsmouth
Marco Bruni, ICG, University of Portsmouth & Dipartimento di Fisica, Roma ``Tor Vergata” Paris 8/12/05 Outline Motivations Non-linear EoS and energy conservation RW dynamics with a quadratic EoS Conclusions
Marco Bruni, ICG, University of Portsmouth & Dipartimento di Fisica, Roma ``Tor Vergata” Paris 8/12/05 Motivations Acceleration (see Bean and other talks): –modified gravity; –cosmological constant ; –modified matter. Why quadratic, P=P o + + / c ? –simplest non-linear EoS, introduces energy scale(s); –Mostly in general, energy scale -> effective cosmological constant ; –qualitative dynamics is representative of more general non-linear EoS’s; –truncated Taylor expansion of any P( ) (3 parameters); –explore singularities (brane inspired). 2 “…my biggest blunder.” A. Einstein
Marco Bruni, ICG, University of Portsmouth & Dipartimento di Fisica, Roma ``Tor Vergata” Paris 8/12/05 Energy cons. & effective RW dynamics: Friedman constraint: Remarks: 1.If for a given EoS function P=P( ) there exists a such that P( ) = - , then has the dynamical role of an effective cosmological constant. 2.A given non-linear EoS P( ) may admit more than one point . If these points exist, they are fixed points of energy conservation equation.
Marco Bruni, ICG, University of Portsmouth & Dipartimento di Fisica, Roma ``Tor Vergata” Paris 8/12/05 Energy cons. & effective Further remarks: 3.From Raychaudhury eq., since, an accelerated phase is achieved whenever P( ) < - /3. 4.Remark 3 is only valid in GR. Remarks 1 and 2, however, are only based on conservation of energy. This is also valid (locally) in inhomogeneous models along flow lines. Thus Remarks 1 and 2 are valid in any gravity theory, as well as (locally) in inhomogeneous models. 5.Any point is a de Sitter attractor (repeller) of the evolution during expansion if +P( ) 0) for 0 ( .
Marco Bruni, ICG, University of Portsmouth & Dipartimento di Fisica, Roma ``Tor Vergata” Paris 8/12/05 Energy cons. & effective 1.For a given P( ), assume a exists. 2.Taylor expand around : 3.Keep O(1) in = - and integrate energy conservation to get:
Marco Bruni, ICG, University of Portsmouth & Dipartimento di Fisica, Roma ``Tor Vergata” Paris 8/12/05 Energy cons. & effective 4.Note that:, thus. 5.Assume and Taylor expand: 6.Then: a)At O(1) in and O(0) in , in any theory of gravity, any P( ) that admits an effective behaves as -CDM; b)For > -1 -> , i.e. is a de Sitter attractor. ¯ ¯ From energy cons. -> Cosmic No-Hair for non-linear EoS.
Marco Bruni, ICG, University of Portsmouth & Dipartimento di Fisica, Roma ``Tor Vergata” Paris 8/12/05 P= ( + / c ) P o =0, = ± 1 dimensionless variables: Energy cons. and Raychaudhuri: Friedman:
Marco Bruni, ICG, University of Portsmouth & Dipartimento di Fisica, Roma ``Tor Vergata” Paris 8/12/05 P= ( + / c ) parabola: K=0; above K=+1, below K=-1 dots: various fixed points; thick lines: separatrices a: > -1/3, no acc., qualitatively similar to linear EoS (different singularity) b: -1< <-1/3, acceleration and loitering below a threshold c: < -1, , de Sitter attractor, phantom for < abc
Marco Bruni, ICG, University of Portsmouth & Dipartimento di Fisica, Roma ``Tor Vergata” Paris 8/12/05 P= ( - / c ) a: < -1, all phantom, M in the past, singular in the future b: -1 c: >-1/3, similar to b, but with oscillating closed models b and c: for < first acc., then deceleration bac
Marco Bruni, ICG, University of Portsmouth & Dipartimento di Fisica, Roma ``Tor Vergata” Paris 8/12/05 P=P o + dimensionless variables: Energy cons. and Raychaudhuri: Friedman:
Marco Bruni, ICG, University of Portsmouth & Dipartimento di Fisica, Roma ``Tor Vergata” Paris 8/12/05 P=P o + a: P o >0, , recollapsing flat and oscillating closed models b: P o >0, -1< <-1/3: similar to lower part of a c: P o <0, -1/3< : phantom for < , de Sitter attractor, closed loitering models. abc
Marco Bruni, ICG, University of Portsmouth & Dipartimento di Fisica, Roma ``Tor Vergata” Paris 8/12/05 Full quadratic EoS Left: =1, <-1, two , phantom in between Right: =-1, >-1/3, two , phantom outside
Marco Bruni, ICG, University of Portsmouth & Dipartimento di Fisica, Roma ``Tor Vergata” Paris 8/12/05 Conclusions Non-linear EoS: –worth exploring as dark energy or UDM (but has other motivations); –dynamical, effective cosmological constant(s) mostly natural; –Cosmic No-Hair from energy conservation: evolution a-la -CDM at O(0) in dP/d ( ) and O(1) in = - , in any theory gravity. Quadratic EoS: –simplest choice beyond linear; –represents truncated Taylor expansion of any P( ) (3 parameters); –very reach dynamics: allows for acceleration with and without ; Standard and phantom evolution, phantom -> de Sitter (no “Big Rip”); Closed models with loitering, or oscillating with no singularity; –singularities are isotropic (as in brane models, in progress ). Constraints: high z, nucleosynthesis ( >0), perturbations.