Error exponents for quantum channels with constrained inputs

For arbitrary states the bound Er(R) is still unavailable, and we content ourselves with Eex(R). We call #(Jr, s, p), ~z(rr, s, p) the quantum Gallager functions. The quantity = max max/2(a', 1, p) 0

is the cut-off rate of the channel, giving an idea of its performance at intermediate rates. Another interesting characteristic of the channel is the value E ( + 0 ) of the reliability function at the zero rate, which we can evaluate both from below and above. THEOREM 3.

-min

rt ~7~1

trEIDI J J

Proof: The first inequality follows from the lower bound for E ( + 0 ) given by Eex(0) = maxmax max/2(zr, s, p), l
0_

(17)

by letting s --~ cx~, p ~ 0. As a first step for obtaining an upper bound for E(+0), we recall the following inequality in the proof of Proposition 2 from [14],

Pmax(W, X) > max -

w~w' "4

Tr

(18)

ERROR EXPONENTS FOR QUANTUM CHANNELS w r r H CONSTRAINED INPUTS

349

where w, w' are codewords from W = (w I . . . . . toM). Generalizing the proof of Proposition 3 from [2], we can estimate the logarithm of the right-hand side of (18) as follows, maxlogTr

>- M ( M

W~W !

--

1)

n

-

- 1)

M(M

logTr V/~wV/~w,

E W,WtE'V~

rain E l°gTr S x / ~ w t k ) ~ l
t

n

-M(M_

l) E k i k j l o g T r

(19)

v/-ffiiv~j

LJ

> - M-

min ~

1 {~i}E7~d1

>

rain

- M-

2riIrj log Tr

(20)

J,j

1 ~'1

log Tr

~ (dx) ~r(dy).

Here w(k) is the k-th component of the codebloek w and ki = ~riM is the number of codeblocks w with Sw(l~,t) = Si, where kopt is the value of k which minimizes Eww, logTr I In addition, ~,¢ is the set of probability distributions with the power constraint f(xi)Tri < E.

(21)

i

Thus the upper bound for E ( + 0 ) is given by (16). 3.

The quantum

Gaussian

[]

channel

We are going to apply the results of the previous section to the quantum Gaussian channel in one mode, which is described below. However, we do this in the way easy to generalize to the multimode case (see [13]). To define the quantum Gaussian state, we consider the unitary operator in 7-[ for a vector z = [Zq, zp] t, V(z) = exp i (Zqq + Zpp),

(22)

where q and p are operators satisfying the Heisenberg CCR [q, p] = ifiI.

(23)

DEFINITION. The density operator S is called Gaussian, if its quantum characteristic function has the form T r S V (z) = exp [imt z - l zt otz] , where m is a column vector and a is a real symmetric matrix.

(24)

350

A. S. HOLEVO, M. SOHMA and O. HIROTA

For simplicity we introduce the column vector R = [q, p]t, by which (22) can be rewritten as V ( z ) = exp(iRtz). Then we can show that m = TrSR,

i t~ - ~ A = TrRSR t.

(25)

The mean m = [mq, mp] t can be an arbitrary vector; the necessary and sufficient condition on the correlation matrix ot is the generalized Robertson uncertainty relation c~ - (i/2)A > 0, where

A =

[0 :]

(26)

-h is the commutation matrix. Let So be the Gaussian density operator with the mean m = 0 and the correlation matrix oc Consider the family of operators S m = Z~(m)SoZ~(m) t, where 7~(m) = e x p ~ ( m p q - mqp) is the unitary displacement operator in 7-t. Then the density operator Sm has the characteristic function (24). In an optical communication system, So describes background noise, comprising quantum noise, and m is the classical signal. Thus the mapping m --~ Sm gives a quantum Gaussian channel. The natural input power constraint is given by (1) with

f(m)

=

1 2 -1-m 2) = ~m 1 t m. ~(mq

(27)

In preparation for obtaining lower bounds for the reliability function, we shall calculate the characteristic function of the s-th power of the Gaussian density operator. LEMMA. For any s > 0, TrSSmV (z) = .Ms(or) exp [imtz - ½ztt~ff, (or)z],

(28)

where the functions .Ms, ~s are defined below by the relations (39). Proof: Consider the density operator Sm with the correlation matrix ot and the mean vector m. Then there exists the linear symplectic transformation £ such that £ A £ t = A and ~t = £ot£. t = )d, where I is the identity matrix [13]. For this transformation we can find the unitary operator U satisfying

v(r.'z) = u t v ( z ) U .

(29)

Applying the unitary operator U and the displacement operator D ( - m ) to S, we obtain the Gaussian density operator S0 with the correlation matrix t~ = ~.I and the mean vector m = 0, 7So = U D ( - m ) S m 2 9 ( - m ) t U t. (30)

ERROR EXPONENTS FOR QUANTUM CHANNELS WITH CONSTRAINED INPUTS

351

Then the density operator So has the spectral decomposition

~n~(~./~'l--1/2~n

1

50 -- )./h + 1/2 _ \ X / h + 1/2,1 In)(nl,

(31)

which allows us to calculate the s-th power of $0 as follows, -

S~) =

(

1

)' ~

A./h + 1/2

(~./h - 1/2~ ~n

,,--o \A.Ih '+ 1/2,1

+ 1/2 = \~./h + 1 / 2 ]

(2./h + 1/2)'

(32)

In)(nl In)(nl],

(33)

where

with

~. = ~.gs ( ~ ) ,

(34)

(d + 1/2)' + ( d - 1/2) ~ gs(d) = - ~ . (d + 1/2), - (d - 1/2) ~"

(35)

1

This implies that up to a constant factor, 5g is a Gaussian density operator with the correlation matrix ~I. We shall use the matrix A - l t ~ which is diagonalizable and has purely imaginary eigenvalues +i ~. It is important that under the linear transformations it changes as the matrix of an operator. We shall also need the matrix function abs(.), which is defined as follows: for a diagonalizable matrix M = Tdiag(mj)T -1, we put absM = Tdiag(Imjl)T -1, see [12] for details. We can rewrite (34) as ~ [ .-~ otgs ( a b s ( A - l o t ) )

(36)

.

Going back to the initial basis, we obtain

1

I

it

]

TrSSV(z) = fs(X/h--------~exp imtz - ~z Otgs (abs(A-lo0) z ,

(37)

where

L(d)=(d+l/2)S-(d-1/2)

s.

(38)

Then we set 1

Afs(t~) = [detfs(abs(A-la))] - : , and (28) follows.

~s(u) = gs(abs(A-lo0),

(39) []

352

A.S. HOLEVO,M. SOHMAand O. HIROTA

This result can be easily extended to the mulfirnode Gaussian state, by using the fact that the operator A-lot is diagonalizable as explained in [12, 13]. If we restrict our attention to one mode, then detot = dett~ = ~2,

abs(A_lot) _ x / ~ o t t,

(4o)

and

JV's(ot)= fs ( dVrd-~/h)-1 ,

(41)

~s(ot)=gs ( d~/'d-~et~/h)I.

(42)

The case s = 1/2 considered in [9] has special features. The functions 1

(d + 1/2) 1/2 + (d - 1/2) 1/2

gl/2(d) = 2---d" (d + 1/2)1/2 - (d - 1/2)1/2, fl/2(d) = (d + 1/2) 1/2 - (d - 1/2) 1/2 are then related by the equation

2dgl/2(d)fl/2(d)2= 1.

(43)

In Appendix we give the proof of the following formula for the the two Gaussian states Sm~, S,n2: Tr

= exp - ~ ( m l - m 2 ) t o t - l ( m l

-

fidelity between

m2) ,

(44)

which will be used in the next section to evaluate the zero-rate value of the reliability function. This formula also has an independent interest, because of the importance of the fidelity in many questions of quantum information theory.

4.

Evaluating reliability function of a quantum Gaussian channel

1. Computation of the Gallager functions. By an appropriate generalization of can take the a priori distribution Gaussian

the argument in the classical case, we

2~r dex/-d-~-~exp where the trace of E satisfies the relation power constraint.

mtE-lm

din,

(45)

l(~qq .~_ ~pp): E following from the

ERROR EXPONENTS FOR QUANTUM CHANNELS WITH CONSTRAINED INPUTS

353

The Gallager function /z(~r, s, p) is given by [

/

"

1

\ l+s

Iz(zr, s,p) =-logTr~JaeP[½mtm-E]Sm~rc(dm) )

•

Using (28),-we obtain /z(Tr, s, p) = (1 + s ) p E - ( 1

+ s) log [det(I - pI2)-1/2A/'r~7+(u) ]

_ log [)V-l+s (G.~+ (or)or + ( ~ - 1 - p / ) - l ) ] .

(46)

On the other hand, using (28) and the formula for the product of two Gaussian states (see Appendix), we have

[1:,

Tr S v / ~ S v ~ 2 = V r S q ~ I Sv~2V(0) =exp

-

m2)t(2~½(oOoO-l(ml

-

m2)

]

,

(47)

and hence

1, × exp [p(lm'm + in n-

S

= 2spE + ~ log det [(I -

p~g)(/-

p ~ + 2 ( 2 s ~ (~)ot) -1E)].

(48)

2. Lower bounds for the reliability function. Now let us turn to the optimization problems (14) and (15), which involve the Legendre transform, and for this the concavity in s of the functions lz(zr, s, p(s, E)), ~z(zr, s, p(s, E)), where p(s, E) is the maximizing value of p for fixed s, is essential. Although it has not been shown that /z(zr, s, p) provides the random coding bounds for mixed state signals, we would assume it in this section. If we consider only pure state signals, the following statements are valid strictly. We shall restrict ourselves to the case where So is a Ganssian state without squeezing, which is a simple example of the mixed Gaussian state. Then ot = ~.I O. > hi2), and the optimum a priori distribution is given by the Gaussian state with the correlation matrix ~ = diag[E, E]. Eq. (46) is simplified as /z(zr, s, p) ---- (1 + s)log f__~ (X/h) + p(1 + s)E + log [A(s, p)l+s _ B(s, p)l+s], (49) where

A(s, p) = ((~.lh)gr~+ (klh) + 1/2)(1 - pE) + EIh, B(s, p) = ((~.lh)g~+~ (X/h) - 1/2)(1 - pE) + Ell~.

(50)

354

A.S. HOLEVO, M. SOHMA and O. HIROTA

Trying to maximize /~(Jr, s, p) with respect to p we obtain the equation 2(1/h - (p)~/h)gr~+~ (~./h))(a(s, p)S _ B(s, p)S) = p ( a ( s , p)S + B(s, p)S).

(51)

This equation can be solved explicitly only for s = 0, 1. Thus, contrary to the classical case [5], the maximum in (14) in general can be found only numerically. The concavity of the function /z0r, s, p(s, E)) can be shown analytically in the case of pure states; we conjecture it holds in general, and we postpone the study of this question to a subsequent publication. For s = 0 we have p = 0 and C = ~--~Iz(zr, O, O) = [(Ns + N + 1) log(Ns + N + 1) - (Ns + N ) log(Ns + N)]

- [ ( N + 1) log(N + 1) - N logN], where N = L / h - 1/2 and Ns = E / h . For s = 1, Eq. (51) has the unique solution p(1, E) = 1 / 2 h g + l / E - O ( E / h g ) / E < E -1, where g = (3./h)gl/2(L/h) and 1 + ~¢/E-f+ 1

O(E) =

2

The important quantity is the cut-off rate given by the formula 6' = / x 0 r ' I ' p ( I ' E ) ) = 2(2-~g + 1 - O ( E / h g ) ) + log O ( E / h g ) .

(52)

We now pass to the expurgated bound in the case of a Gaussian state without squeezing. By putting ot = LI and I] = diag[E, El, (48) is simplified as ~z(zr, s, p) = s 2 p E + log

1 + p2E2 - 2 p E +

hgs

]j

(53)

The optimization of the expurgated bound can be performed analytically. Taking the partial derivative with respect to p we obtain the equation p2 _ p

(~gs

+

1)

1

+ 2h gs E = O.

The solution of this equation, satisfying p < E - 1 , is p(s, E) --

1 1 + 2hgs E

O(E/hgs) E

Substituting this in (15), we obtain the following expression, which is to be maximized with respect to s _> I,

ERROR EXPONENTS FOR QUANTUM CHANNEI.~ WITH CONSTRAINED INPUTS

~t(rr, s , p ( s , E ) ) - s R = 2 ( 2 - ~ g + S - s O ( E / h g s )

355

) +slogO(E/hgs)-sR.

This function is readily shown to be concave in s. Taking the derivative with respect to s, we obtain the equation

O(E/hgs) = e R, the solution of which is s =

E

2hg~/e 2R - e R"

(54)

If this is larger than 1, which is equivalent to

R < logO(E/hgs) = 0-~/2(7r, 1, p(1, E)), then the maximum is achieved for the value of s given by (54) and is equal to E ~g(1 - v/1 - e -R) = Eex(R) > Er(R),

(55)

(which up to a factor coincides with the expurgated bound for the classical Gaussian channel). In particular /z(Tr, 1, p(1, E)) is equal to /2(~r, 1, p(1, E)), that is the cut-off rate C. In the range O-~/2(zr, 1, p(1, E)) _< R _< ~s/~(zr, 1, p(1, E)),

(56)

where the optimizing s is equal to 1, we have the linear bound

Eex(R) = Er(R) =/z(zr, 1, p(1, E)) - R,

(57)

with the quantities ~/z(~r, 1, p(1, E)), defined by (52). Finally, provided /x(~r, s, p) is indeed concave, in the range O ~s/z(~r, 1, p(1, E)) < R < C we have Eex(R) < Er(R) with Er(R) given implicitly by (14).

3. Reliability function at the zero rate. Finally, let us calculate the bounds (16) for the quantum Gaussian channels; we can calculate them for the general Gaussian state in one mode, unlike the random coding bound or the expurgated bound for E(R). There exists a unitary operator such that diag[y:, y-2] = O~Ot/)., where V is a parameter related to squeezing (y = 1 corresponds to no squeezing). We further

356

A.S. HOLEVO, M. SOHMA and O. HIROTA

assume that diag[crl, o.2] = 0 ZOt. Substituting (44) to the fight-hand side of (16) and transforming the variables of the integral by the unitary operator O, we obtain 1

E(+0) < - - max [y--2o. 1 -It- y2o.2] = F2E/X,

(58)

- 2~. ~reT'l

where we suppose y _> 1 and then the optimum distribution is given by [o'1, o.2] = [0, 2E]. On the other hand, substituting (47) to the left-hand side of (16), we obtain

yEE/hg <_E(+0).

(59)

Thus we have obtained the bounds for E(+0). In particular, for a pure (squeezed) state we get the exact value, given by simple formula E ( + 0 ) = 2yEE/h. Appendix

1. Characteristic function of the product of two Gaussian states. The following multiplication formula

TrS1S2V(z) - (2~) t

TrS1V(v)TrS2V(z - v)exp -~v Az dr,

(60)

where ~ denotes the number of the modes, was established in [10]. Substituting

TrSjV(z) = exp im}z - ~z otjz

(j = 1, 2)

(61)

into (60), and performing the integration, we obtain

TrSIS2 V (z) = [det A - l ( a l + a 2 ) ] - ~ exp --~(ml + m2)t(~l + ~2)-l(ml + m2)

[1

]

x exp -~((ot2 + (i/2)A)z -- 2im2)t(otl + ot2)-l((al -- (i/2)A)z --2iml) . (62)

2. Proof of the relation (44)for the fidelity between two Gaussian states. Using (24), (28) and (62), we have

Tr Sx/~m~Sv~mV(z)

[1

= exp -~(ml

-

m2)t(2~l/2(a)ot)-l(ml

1

-

m2)

]

× exp [--lzt (~ot~l/2(ot) -- 8A~l/2(ot)-lot-l A) z + irltz + (tz ] ,

(63)

ERROR EXPONENTS FOR QUANTUM CHANNELS WITH CONSTRAINED INPUTS

357

where

ml + m2 n --

=

2

,

(64)

4AOt-I#I/2(Ot) -1 (ml -- m2).

(65)

Let us consider a trace-class operator T with the characteristic function I t TrT V (z) = exp [imt z + ~t z - -~ z otz] .

Then,

(66)

using the formula (60), we have Tr T* T V (z) = exp[~tot -1 ~ ]TrS 2 V (z),

(67)

where S is the Gaussian density operator with the characteristic function

TrSV(z) = exp [i(m + ~Aot1 t otz]. 1 1~) t z _ ~z L

z

(68)

.I

This yields T r I T [ = T r T ~ / T - ~ V ( 0 ) = e x p [ l ( t o t -1 ( ] .

(69)

Combining (63) and (69) we obtain (44), which also holds for the multimode case. Acknowledgment. A. S. Holevo is grateful to Prof. O. Hirota for his hospitality at the Research Institute of Tamagawa University where this paper was initiated. REFERENCES [1] S. L. Braunstein: Squeezing as an irreducible resource, LANL Report no. quant-ph/9904002. [2] M. V. Burnashev and A. S. Holevo: On reliability function of quantum communication channel, Probl. Peredachi Inforr~, 34 (1988), 1-13 (in Russian); LANL Report no. quant-ph/9?03013, 1997. [3] C. M. Caves and P. B. Drummond: Rev. Mod. Phys. 66 (1994), 481-538. [4] A. Furusawa, J. S0rensen, S. L. Braunstein, C. Fuchs, H. J. Kimble and E. S. Polzik: Science 282 (1998), 706. [5] R. G. Gallager: Information Theory and Reliable Communications, J. Wiley, New York 1968; Section 7.3. [6] J. P. Gordon: Quantum effects in communication systems, Proc. IRE, 50, N9 (1962), 1898-1908. [7] J. P. Gordon: Noise at Optical Frequencies; Information Theory, in Quantum Electronics and Coherent Light, Proc. Int. School Phys. "Enrico Fermi", Course XXXI, ed. P. A. Miles, Academic Press, New York 1964, pp. 156-181. [8] C. W. Helstrom: Quantum Detection and Estimation Theory, Academic Press, New York 1976. [9] A. S. Holevo: On quasieqnivalence of quasffTee states, Teor. Mat. Fi~, vol. 13, pp. 184-199, 1972 (in Russian). English translation by Consultants Bureau, Plenum Publ. Corp., 1071-1082, 1973.

358

A. S. HOLEVO, M. $OHMA and O. HIROTA

[10] A. S. Holevo: On the optimal measurement of the mean value of a Gaussian state, Techn. Cybern., NS, (1974), 152-158 (in Russian). [11] A. S. Holevo: Coding theorems for quantum channels, Tamagawa University Research Review, N4, 1998. LANL Report no. quant-ph/9809023. [12] A. S. Holevo: Sending quantum information with G-aussian states, Quantum Communication, Computing, and Measurement 2, pp. 75-82, Kluwer Academic/Plenum Publishers, New York 2000. [13] A. S. Holevo, M. Sohma and O. Hirota, "The capacity of quantum Ganssian channels ," Phys. Rev. A, 59, N3 (1999), pp. 1820-1828. [14] A. S. Holevo: Reliability function of general classical-quantum channel, LANL Report no. quantph/9907087. To appear in IEEE Trans. Inform. Theory, 46, N6, 2000. [15] R. S. Ingarden: Rep. Math. Phys. 10, (1976), 43-72.