Idempotency Equation and Boundary States in Closed String ... · 2004/6/22 seminar@Osaka Univ. 1...

2004/6/22 seminar@Osaka Univ. 1

Idempotency Equation and

Boundary States

in Closed String Field Theory

Isao Kishimoto

(Univ. of Tokyo)

[KMW1] I.K., Y. Matsuo, E. Watanabe, PRD68 (2003) 126006

[KMW2] I.K., Y. Matsuo, E. Watanabe, PTP111 (2004) 433

[KM] I.K., Y. Matsuo, PLB590(2004)303

Introduction

• Sen’s conjecture:Witten’s open SFT

∃ tachyon vacuum

• Vacuum String Field Theory (VSFT)[Rastelli-Sen-Zwiebach(2000)]

D-brane～ Projector with respect to Witten’s ＊ product.

(Sliver, Butterfly,… )

D25-brane

D-brane ～ Boundary state ← closed string

Closed SFT description is more natural (!?)

HIKKO cubic CSFT (Nonpolynomial CSFT)

Contents

• Introduction

• Star product in closed SFT

• Star product of boundary states [KMW1]

• Idempotency equation [KMW1,KMW2]

• Fluctuations [KMW1,KMW2]

• Cardy states and idempotents [KM]

• TD,TD/Z2 compactification

• Summary and discussion

Star product in closed SFT

＊ product is defined by 3-string vertex:

• HIKKO (Hata-Itoh-Kugo-Kunitomo-Ogawa) type

and ghost sector (to be compatible with BRST invariance)

with projection:

α1α2

Overlapping condition for 3 closed strings

Interaction point

• Explicit representation of the 3-string vertex:

solution to overlapping condition [HIKKO]

( Gaussian !)

: Neumann coefficients of light-cone type

We can prove various relations. [Mandelstam, Green-Schwarz,…]

[Yoneya(1987)]

Star product of boundary stateThe boundary state for Dp-brane with constant flux:

“idempotency equation”

Idempotency equation

The boundary state which corresponds to Dp-brane is

a solution to this equation in the following sense.

• Boundary state as an “idempotent” :

• “Non-associative” product for coefficient functions

in “non-commutative” background.

[Kawano-Takahashi (1999)]

cf. [Murakami-Nakatsu(2002)]

In particular, one of the two α-parameter becomes zero,

this induced product becomes Strachan product :

Projector eq. with respect to the Strachan product

which is commutative and non-associative.

Feature of the HIKKO ＊ product

Fluctuations

By straightforward computation in oscillator language, we found scalar

and vector type “solutions”:

cf. [Hata-Kawano(2001)]

A sufficient condition for this solution : primary with weight 1

cf.[Okawa(2002)]

By modifying the vector type fluctuation [Murakami-Nakatsu(2002)] :

Cardy states and idempotents• On the flat ( Rd ) background, we have ＊product formula

for Ishibashi states :

Conjecture

Cardy states ～ idempotents in closed SFT

even on nontrivial backgrounds.

• Orbifold （M/Γ）

[cf. Billo et al.(2001)]

• Fusion ring of RCFT

[Verlinde(1988)]

[T.Kawai (1989)]

TD,TD/Z2 compactification

Explicit formulation of closed SFT on TD,TD/Z2is known. [HIKKO(1987), Itoh-Kunitomo(1988)]

We can compute ＊product of Ishibashi states directly.

3-string vertex is modified: cf. [Maeno-Takano(1989)]

＊products of these states are not diagonal.

→ We consider following linear combinations:

doubling

～ doubling of open string 1-loop

regularize

[Asakawa-Kugo-Takahashi(1999)]

Boundary 2

Boundary 1

Ratio of 1-loop amplitude:

（※） Neumann type idempotents are obtained from Dirichlet type by T-duality :

Summary and discussion• Cardy states satisfy idempotency equation

in closed SFT (on RD,TD,TD/Z2 ).

• Variation around idempotents gives open string spectrum.

• Idempotents ～ Cardy states

: detailed correspondence?

• Closed version of VSFT? (Veneziano amplitude,…)

• Relation to the original HIKKO theory?

• More nontrivial background? (other orbifolds,…)

• Supersymmetric extension? (HIKKO’s NSR vertex,…)

• 3-string vertex in Nonpolynomial CSFT

• n-string vertices (n≧4) in nonpolynomial CSFT?

We can also prove idempotency straightforwardly:

(Computation is simplified by closed sting version of MSFT. [Bars-Kishimoto-Matsuo] )

← closed string version of Witten’s ＊ product

Idempotency Equation and Boundary States in Closed String ... · 2004/6/22 seminar@Osaka Univ. 1...

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