A criterion for local instability of a geodesic flow from the Jacobi equation in Fermi basis

A Criterion for Local Instability of a Geodesic Flow from the Jacobi Equation in Fermi Basis MAREK Astronomical

Ohsenator];.

SZYDtOtVSKI

Jagellonian

University.

JERZY Department

of PhyGcs.

Ptdagq$cnl

Orb

171. 30-244

Cracow.

Poland

SZCZFSM

University.

Podchorqiych

2. ?O-C4h Crcrcow.

Poland

and

hIAREli Copernicus

Astrowmical

I. GWI)I
WC shall metric

investigate

tensor

Center.

Bnrtycka

IXVIA’I‘ION

the gcodcsic

g. The ccluntion

tIIESL\DA

llow

IS. 00-716

IX)U,\lION

IN FERXII

on Ricmannian

of gcodcsics

Warsaw.

(or

Poland

B>\\sIS

pscudoricmannian)

spaces with

rends: V”U

=

0,

(1)

whcrc u is the vector field tangent to the geodesic and V denotes the covariant derivative. Therefore, Ict LIS consider ;I gcodcsic congruence on the manifold M. Then let us take a curve C orthogonal to the consrucncc, i.e. a curve which intersects each geodesic just one

time. We shall assume that the affinc zero at the point of intersection with curve

C along

gcoclcsics

parameter the curve

to a new position

s measured along the geodesic is equal to C. Next by displacing all the points of the

labcllcd

by s WC construct

the family

of curves

C,. In this way wt’ obtain a certain two-dimensional submanifold in the region where the congrucncc is defined. Let us dcnotc by u~,.~) the vector field tangent to geodesic at the point for which the parameters mcasurcd along gcodcsic and along C, curves arc (s, A). Let ub also dcnotc by z(T,i) the vector field tangent to C, curve at the same point. Obviously [u. $1 = 0. Because

the connection

I- is torsion-free, T(u,

5) = c,<

(2)

WC have: -

V$l 232

-

[u, $1 = 0.

3-t

and hence: Y “Y= = r,u. The vector

< informs

us about

all start from some arbitrarily We shall now calculate geodesic.

the relative

position

of points

chosen curve C. the accelleration with

which

on neighbour the

vector

geodesics

E varies

which

along

the

We have: R(u.

where

(3)

R(u,

g) is the

;I,u = Y’,T’,u

curvature

tensor.

-

By

r’,r’,u

-

Y,“,<,U, the

combining

(J)

formulae

(1).

(2)

and

(4)

u-e

obtain: Y”Y$l and since (3) is valid

\ve finally

arrive

= R(u,

c;“)u.

(-5)

$,u.

(6)

at the formula: Y”Y,$

= R(u,

As

it has just been mentioned we are interest4 in relative motion of geodesics not of about the position of point from uhich points on them. The vector f contains information to u and is the gcodcsic starts. This information is carried by the component of < parallel unimportant

for our

purpose.

Therefore

we shall

consider

the component

of c orthogonal

to II. Let us write: 5 = whcrc

n is the vector

orthogonal

I1 +

Al

,

to u, 1. E IR. WC have: g(<. u) = JJ(n, 11) +

Lkxxusc

(7)

g(n, u) = 0. then by normalizing

Q(ll,

the tangent g(f,

u).

vector

(8)

g(u, u) = 1 wc obtain:

u) = EL,

(9)

2lld n=;l-

g(&

U)U.

(10)

vector I’iclcl II is collcd ;I gcodcsic deviation field and carries information about position of ncighbour gcotlcsics. WC shall now find an equation for the acccllcration vector n along the gcoclcsic. From the equations (9) and (IO) wc have:

The

~“~“(11 ht:

-r”[ll

+

g(f,

u)]

=

T,,Il

+

+

g(T,,;17

g(f,

U)UJ

u)u

=

= -i”Il

‘c .f 011

the

other

obtain

bvc’

hLld:

f?(U,

I1 i

~(2.

U)U)U

=

+

II

g(T$l,

+

g(f, u)u

U)U), =

T,,Il.

It

Illc;llls

that:

T,,n.

= f<(U,

(Ill

fl)ll

f

g(:,

U)f?(U,

tJ)U

=

f<(U,

1l)U.

fjcllcc

that r,,YUn

The

R(u.

rclativc of the

equation

(13)

callccl

;I

= R(u,

deviation

gcodcsic

n)u.

equation

(12, plays

;I

crucial

role

in our

iri/

the

n \2xtor

furthcr-

clixussion. WC arc

gcodcsic.

now

able

to

tell

b\hat

Since /~ij = [Sq(n, n)]’

ti -cl !

Ill:

i5 fhc

;1cCcIICr;ltic)n

of

the

lcngtli

‘. wc have: =

-L IIli

y(T,,n. ’

11)

=

4 1”

g(r1,

-c’,,Il)

of

;tlong

Local stability

Thus we arrive at the following -$

a geodesic

of

23.5

flow

equation:

/nj’ = -2R(

u, n, u, n) + 2g(V,n.

V,n).

(13)

of the Riemann tensor. where R(u. n, u. n) = R,,krdn’uknl and Rllkl are components It is suitable to write the geodesic deviation equation in terms of a linear operator K,:T,M - TqM. defined as VlA E T,M:K(A) = - R(A, u)u. One can easily check that this operator is symmetric in the sense of metric 5: g(A, The geodesic

deviation

equation

K(B))

= g(B.

in terms of the K-operator C,V,n

In local coordinate

system

K(A)).

(14) reads:

= K(n).

(15)

(x’}, we have:

I\; = (dx’,

R(u, a,)~) = (dx’, R5,,k,~‘“~ki3;) = R:,,k,d”Ilk,

(16)

or h’; =

--R;,,,kll”‘llk.

(17)

The next suitable procedure is to introduce the so called Fermi basis [I]. The construction vectors on the hypersurface T,H of this basis is following. We choose N - 1 orthonormal orthogonal to u at point q of the geodesic. Then we identify the Nth basis vector with the vector u at point (1 i.e. E,v = u. As a result we obtain the basis E,, . . ., E, in TqM such that g(E,,, E,,) = ii,,,, for all cr$ = 1, . . ., N. Then WC move this basis parallelly along the basis gcodcsic (i.e. G,E, = 0, for N = 1, . . . , N). In this way we define an orthonormnl along the gcodcsic. WC can write in this basis: n = rl“E,,

(Y = 1, . . ., N

V,,n = E, F,

V,V,n From the equations K(n)

:

dZllrn = E, ds2 ’

(18)

(18) we obtain: = n”K(E,,)

Finally

the geodesic

where

h’z = -R:vtrv.

deviation

= II”R(E,~, E,,)E, equation

We can associate

in Fermi

= r~“E,R:b,v,~ = -E,

R$,,,v,l”.

basis takes the following

form:

a dual basis {E”} with the basis {Et,}, so that: (E”,

EP) = L$.

(21)

Bccausc: K;; = -(E”,

R(E,,, u)u),

then $

K;; = -‘?,[(E”.

R(E,,,

u)u>]

(10)

= - (V,E”,

R(E,,, U)U> - (E“,

V,( R(E,,. u)u)).

is equal

The first term E;‘[T’,(R(E,.

u)u)]’

to zero.

whereas

the second

= E:‘~c~~~R;,,,,,fl’E;;rl” = E:[11’~~R;,,,,f1’E;l’rl”

Hence.

one reads:

+ 1l*~~R;,,,,,11’E;l’rl”j

= E;‘~,Ri,,,,,~1’~1’E;;‘rl”.

we obtain:

__ (“1 The

equation

(22)

implies

that the

T-iR;,,,,, = 0 (the so called equation (20) can he easily

2. A CKITEKION

It is generally there

esists

informs

ii

to rckvritc

solved

FOK LOCAL

;i comples

;I simple us about

the local

has constant spaces).

In

components

these

caws

in spaces

the geodesic

problcrii

to solve

of averaging instability

deviation

for

brhich

deviation

[2]

INSTAI~ILIT~ FKOhI THE A\‘F:KAGEI) GEOI)ESIC EQUATIOS

procedure

the gcodcsic

K-operator symmetric

locally

=

deviation

implie

of a gwdcsic

equation

T’,,I-,,I1

the geodesic which

that

flui\..

D’n

=

-grad,,

Severthclc45

of the Ricci

It is convenient

in the following

-

equation.

the sign

DE~~I:\TION

for

this

scaI;~r

purpose

form:

(2.3)

L’,,(n),

tls’

3

(grad,,)’

= g” --. 311’

and l,',,(u)=

convcnicncc

?‘hc

V,,(n)

25

;I

-4(II.

ot the equatiorl

certain

potential

(23)

whose

R(l1,

n)u)

consists

gradient

=

;f\‘(Il.

u.

in fact that dctcrniincs

Il.

Ll).

bc can look

the

rh5

up011 the qu:intit>.

ot’ the gcocicsic

clcviation

equation.

/‘i-00/~ Consists

ll”dlli

iI1 simple

nlgcbra:

+ $“~~~,f~;,,,ll”fl’ll’)= i( R;,~,rl”ll’rlA + ~“/i,,,,,l,“ll’i =

Hcncc

-i[(R(u.

1l)U)’ +

(li(l1,

)

Il)ll)J

-=

-R(u.

I

1l)ll.

WC hnvc V,(n)

as :I quantity For- arbitrary

playing vector

the role ficlcls

=

of ;1 potential

!f<(u,

II. C. I))

(Z-1)

in the _ccodcsic d~viatioll

A and 1) wc can tlcfinq

K(A.

II. u. n)

ttlc Ricrrlann

=
I))Ii).

t’clu;ltion.

cur\‘aturc

tcnwr

ah:

(‘5)

Local stability

We can also define

the two-dimensional

of a geodesic

curvature

flow

237

KAiB along

the direction

determined

by

these fields: R(A, From

the equations

B, A. B) = K,,,,[g(A,

A)g(B,

B) -

= iK,:,g(n.

n),

because g(u. u) = 1. and g(n. u) = 0. While investigating the geodesic deviation neither

B)g(A.

B)].

(26)

(23) and (26) we obtain: v,(n)

precisely

g(A,

the tangent

vector

we

u, nor

the

are

(27)

not

deviation

in

general

vector

able

n for

to

determine

the specific

initial

value of the parameter S. Therefore it seems reasonable to discuss the geodesic deviation equation o_riginating from a certain averaged potential P(n). We shall define this averaged potential V(n) by choosing the vectors u and n at random, i.e. we assume that every direction determined by the bivector u A n is equally probable. In this way we associate the averaging mean which

procedure

the set of dimension

bivectors

with

the space of two-directions.

have the following

,, ,)QQ = ;(A”

We shall denote the pair of indices tensor in the space of two-directions:

(iliz)

that this tensor

B’: _ Al: &I).

by an ovcrnll

Q:ll = sI,,,&:,: chcckcd

we

form: (A

It can he easily

By the space of two-directions

A A B = !(A” B” - A’: B”)a,, A 3,:. This is a linear space M = i N(N - l), where rV = dim M. The components of

all bivectors is equal to

-

index

I. Let us introduce

the metric

S#,,&,~

(28)

is symmetric: Q=,I = Q=,,*

The mclric

C,, satisfies C(A

the following A 11, c

(29)

identity:

A I)) = $(A.

C)g(IS,

I)) -

g(A,

I))@,

C)

(30)

I3y virtue of the Schwartz inequality the quadratic form defined by the Cl,-matrix is positively dcfinitc, hcncc C defines an cuclidcnn metric in the space of two-directions. In order to dcfinc a malrix invcrsc to C,, wc have to clcfinc a unit operator in the space of two-directions. We shall denote its components by 0: and dcfinc as ii;(A

A

1%)’

=

(f\

A

Ii)‘.

(31)

Hence,

b’h. = ;(cb;‘,q Let us dcnotc

by C”

the inverse

of C,,.

- CqAp,).

Obviously

(31)

WC have CK,C”

= Oi.. Thus

q=/, = ~(g/1~ls/:12 _ s/l~:s,:li)~ We shall not rcwritc V,(n)

the potential = iR(n.

V,(n)

(32)

in terms of bivcctors:

II, n, u) = ~R,,klll’flirl’ll’ = iR,,(n

A

u)‘(n

A

u)’

(33)

WC have used the known symmetry of the Ricmann tensor IFl,, = !R,,. In general quantity R(I\, It. it. I)) dcfincs a certain quadratic form in the space of two-directions: whcrc

R(A. As

it

is

well

known,

I%, r\, 15) = R(i\ there

exists

A

1%. t\

a basis

A

ii)

{E,,},

=

R,,(/\

n = I,

A

I{)‘(,\

. ., iN(

A

N -

the

It)’

1) in the

space

of

M.

139

er al.

SZY~OWSKI

two-directions for which lR(E,. Eb) = Adbob and C(E,. Eb) = b,,. R(A A B. A A B) = 1.,(x’) + . _ . + AM(rM)‘. where A A B = Y’E,. We can now define the averaged potential P(n): R(A where assume fix the sphere

A B. A

In such

basis

we have:

B)dC’,

A

(34)

IS the volume of M - 1 dimensional sphere Sl’-‘. In the other words we volS,!‘-’ that none of the geodesics is privileged and neither is the deviation vector. We only length of bivectors by assuming that C(A A B. A A B) = g(n. n). This defines the S;‘-’ of the radius r = [g(n. n)]‘,’ In the space of two-directions. Hence.

I,~~,_,

P(n)= zvoIk ,,-, ,

[A,(x~)~ + .

+ A,,(.r”)‘]dL’.

and because: .M - I ,

~‘e arrive

(.rU):dV

= ‘O’i;

r’ = +

volS:‘-‘g(n.

n).

at the formula: I

‘(n)= 2MI

IAl + .

+

A,,]Lq(Il.

n)

However A, + whcrc

. + J’,,, =

IR,,C” = ;R ,,,:,,,:[g”“$J’:

R is the Ricci scalar.

Thcrcforc

the avcragcd

clircction

dctcrmincs

oC gcoclcsic

tangent

vector

the: gcodcsic

N(N

to unity).

fQ(n.

I)

deviation

and the dircctir)n

is normalized

-

J = ;[ R,:,$=

potential

I

c3 (II) = This potential

- pg”‘:

-grad,,

has the form: (35)

in which

vector

The corresponding

D?n^ -= ds?

= R.

II).

equation

of dcvintion

+ R ,,,, g”“]

(with

WC randomly

the only

equation

choose

the

that

the

constraint

reads:

P(n).

!A)

II2 7

ds-

If u’c introduce

;I Fermi

basis (E,}

2R

fl’ = -

along

,V(;\’

-

I)

the randomly

2X 7d? ff” = iV(iV dsOne see from equation is containccl in the Ricci scalar for locnI

instability

spaces implies

of geodesics.

chaos in a gcodcsic

A’ is the

dimension

(36)

chosen

gcoclcsic.

WC obtain: (37)

I) Ti”

that the full information cunccrning the local instability R. The negativity of the Ricci scalar is a sufficient condition The

property

rz-

of local

of the

space

2R N(N

-

1)

011 tvhich

instability of geodesics on compact the mean timescale for mixins as

-12 1

flow. We can estimate

[

where

ii’,

the

gcodtzsic

(‘S) flow

is defined.

The

Local stability

of a geodesic flow

239

relaxation time r is a time-scale in which the length (nl of the deviation vector increases e-times in average. The inverse of t corresponds to the positive Lyapunov exponent [2]. It is worth noticing that the equation (37) has the same form as in the case of maximally symmetric spaces for which the Ricci scalar is proportional to the Gauss curvature. As it is known, a geodesic flow on the compact space with negative Gauss curvature becomes an Anosov flow [3]. It implies that after averaging the Ricci scalar contains the full information about the local instability and plays the role analogous to that of Gauss curvature in the case of maximally symmetric spaces. Of course, if M is a compact Riemannian manifold such that its curvature in an arbitrary two-direction is negative (such manifolds do exist [-I]), then the geodesic flow is an Anosov flow. The geodesic flows on compact Riemannian manifolds will obviously have the same property. In this sense we can say that the criterion of negativity of the Ricci scalar is a generalization of classical works of Anosov.

3. APPLICATIONS 3.1.

Locnl iustabiliry of r~llllritIir~lcrlsio,lal~~on~oge~~cowcosmological models

The Maupertuis principle of classical mechanics [4] allows for representing the trajectories of a Hamiltonian system as a geodesic flow in certain region of the configurational space (for details see [2]). The system with the Hamiltonian: H = +“h(cl)l“,~~b cl”, p,, arc coordinntcs and momenta cncrgy, is equivalent pscudoricrnannian) manifold with the metric:

whcrc

T = $d’p,,p,, is the kinetic

+ V(q). respectively, V(q) is the potential to,a gcodcsic flow on a Ricmannian

and (or

ds’ = 2 Wcl,,,,dq” dclh, ds = 2Wdt, whcrc 2W = l/r - VI, and II is the mcasurcd along geodesics which formula of (30). This means that Lagrange function L = ~a,,Q’cj’ -

total energy. Note that there is a new affinc parnmctcr s is conncctcd with the dynamical time I by the second the equations of motion of the system dcscribcd by the V(q) arc reduced to the geodesic equation:

d’ ds’.- (1’ + ds = dr where

2W = I/z - V(q)l.

Because

the subspace I-,, of the phase-space

(39)

r;k

drl’ d# ds ds

-

= 0,

2W(q(s(O)),

the total energy is conserved

(40) the motion

takes place in

r such that

rh = {(p,

(I):

~u"~J,/J,

+

V(q) = /I}

(41)

or in the subspace Q of the tangent fibre bundle TM:

Q = ((4, 0): Cl,,(C/)lj’Cj’= 2W). Hence the problem is reduced to determining the geodesics on a Riemannian where M is a configurational space and g is the metric: S,, = WQ,,.

(42) space (M,

g)

(43)

In constructing the multidimensional sional Einstein-Maxwell action:

s=

cosmological

&

dDx(-detjj,,)“‘(fi

I

ii

models

we start

from

a multidimen-

- 2i),

where D = 1 + n + ii is the dimension of total space-time. n and fi are dimensions of the physical and internal spaces respectively. i is the D-dimensional cosmological constant, 6 is the D-dimensional gravitational constant. According to the philosophy of Kaluza and Klein we can represent the metric of a D-dimensional spacetime in the form:

0. 1. ., II, a.6 = I.. ., if, h is a function of time. The metric S;,(,, is associated with that of the physical space g!,,, by the relation g,,V = I\~‘~,,,.. where N.’ = /T-‘” (“-I’. We shall assume that the metric ,c,,~ describes a ii-dimensional space of constant curvature, i.e. R,,,, = k?g<,,,. The above assumptions allow for representing the action (44) as arising from the Lagrangian:

il.\‘=

L = (-det

&JZ

&

R -

&3pj~” -

V(Q)

[ whet-c G = 6/(detCqGrh)“‘,

$,= h--‘{C[l

V(d))=

(46) I

+ fi/(rl -

l)]}‘,” In h, h’= (SnG)‘,‘.

and

5 {4-2I-((,,_,)(;+,I _ ,) j’s]

- gLsp

[

(g,“I,’j’ y)

-2K

(47)

‘.

Aflcr the climcnsional rccluction this milltidirncnsionnl systcrn bcconics equivalent gravity and scalar ficlrl couplccl niinim~~lly. By choosing such ;I coorclin;ltc systcrn that:

to

(-IS) Lvhcrc R,, is the metric of a constant wc’ finally arrive at the formula:

ciIrvnturc

[_ = (dct J,,)‘F{hq-+(,I lvhcre the clot clcnotcs the system rcacls: I/ and the constant

pscudoricmannian

-

the diffcrcntiation

=

condition

-+(,c

spxc.

+ $?c-‘-]

with rcspcct

- 1,;> +

is: I/ = 0. The

I,:’

and by introducing

$

I- &4 -

to time.

cj’ - g&-‘;

~lamiltonian

sonic

Hence

ntx

variable

V(C/I)} the Hamiltonian

+ h-)V(Q), (50) induce5

(50)

;I gcoclcsic

!lo\\

011 ;I

space with metric:

cl.sJ = 2Cl’(d~j~ - ‘I:?) ;. bvticre 5 = of a gcoclcsic

for

2r1( r1 - 1) :. c/l = KqJ 211cl ?\I/ = h-’ v(&K) flow is detcrminccl by ttic Iiicci scalar:

(51) -

J r?e-’

’ “I’‘-‘I

‘,

Local

illstal)ili[\

Local stability of a geodesic flow

case when V = 0 or A = 0 and ii = 0 the Ricci scalar (52) is equal the fact that the corresponding systems are integrable. If the internal

In particular This reflects Ricci

flat (R

to zero. space is

= 0) we have: sgn R = sgn(Ri).

This means that the system

is locally

unstable sgn R =

Therefore

the

system

sgn R = sgn (RA)

3.2.

Choric

In general Hausdorff defines

is unstable

and the system

hellclriolrr relativity

differential

locally is unstable

(53)

if RA < 0. In the case of (? = 0 and n = 3: -sgn(Ri?). if

(54)

Rt? > 0.

when

Analogously

for

R and A are of opposite

fi = 0.

we

have

signs.

of gt~0dcsic.s in spficctirncs the spacetime

manifold

the causal structure

is modelled

and g is a Lorenzian

of k! imposes

certain

by a pair metric. restrictions

(AI,

g) where

The Lorenzian on topology

bf

is a C”-class

structure

which

of the spacetime

[I]. Namely the spacetime is non-compact or if it is compact its Euler characteristic must vanish. Timclike or null geodesics in spncctimc have a deep physical meaning since they rcprcscnt historics 01 obscrvcrs or photons. Thcrcforc it is interesting to ask whcthcr gcodcsic flows in spacctimcs can bc locally unstable or can possess a mising property. It has been cstnblishcd that the so called Mixmastcr models exhibit a chaotic behaviour of scale factors. Howcvcr the scale factors alons have no physical meaning. Therefore our clucstion about chaos in gcodcsics is a physical one and can bc answcrcd within the frames of above dcscribcd formalism. In the cast when the spacctime is compact and its Ricci scalar is ncgativc the gcodcsic llows are Anosov tlows and consequently are crgodic. It should bc strcsscd, however, that the compact spacctimcs can bc pathological due to cxistcncc of closed timclikc trajcctorics [I]. When

the spacetime

is not compact

and has a negative

Ricci

scalar,

then

the gcodcsic

flows have the property of local instability. Projections of these gcodcsics on hypcrsurfaces of constant time represent the trajectories of observers or photons and can become Anosov flows provided the Ricci scalar is negative. As an example we can take the bchaviour of geodesics

in the so called

Ellis small

and Prigogine [5]. They show time, when suitably projected

that into

world,

which

has been investigated

by Lockhart,

non-spacelike geodesics in Robertson-Walker a three-dimensional compactified hypersurface

Misra spaceof a

constant negative curvature, change into geodesics paramctrised by a new affinc parameter. It is interesting that in Mixmaster models the criterion of ergodicity of geodesic flows on hypcrsurfaces of constant time is equivalent to the corresponding condition (R < 0) for a whole moclcl. In the other words chaos in geodesics is a consequence of chaotic nonlinear dynamics of the spacetime which is an arena for all events. When the spacctime is compact and its Ricci scalar is negative, then the geodesic flows have mixing property. The negativity of the Ricci scalar has a simple physical meaning. Namely the condition R < 0 implies E + 311 < 0. where F is the energy density and 1~ is the pressure. It means that the strong energy condition is violated. On the other hand the violation of the strong, energy condition solves the horizon problem in Friedman world models [6].

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