Strings on a Cone and Black Hole Entropy

Atish Dabholkar

Strings on a Cone and Black Hole Entropy

Atish Dabholkar

Abstract

String propagation on a cone with deficit angle $2π(1- \frac{1}{N} ) $ is described by constructing a non-compact orbifold of a plane by a $Z_{N}$ subgroup of rotations. It is modular invariant and has tachyons in the twisted sectors that are localized to the tip of the cone. A possible connection with the quantum corrections to the black hole entropy is outlined. The entropy computed by analytically continuing in N would receive contribution only from the twisted sectors and be naturally proportional to the area of the event horizon. Evidence is presented for a new duality for these orbifolds similar to the ${\scriptstyle R} \rightarrow {1\over R} $ duality.

Strings on a Cone and Black Hole Entropy

Abstract

String propagation on a cone with deficit angle

is described by constructing a non-compact orbifold of a plane by a

subgroup of rotations. It is modular invariant and has tachyons in the twisted sectors that are localized to the tip of the cone. A possible connection with the quantum corrections to the black hole entropy is outlined. The entropy computed by analytically continuing in N would receive contribution only from the twisted sectors and be naturally proportional to the area of the event horizon. Evidence is presented for a new duality for these orbifolds similar to the

duality.

Strings on a Cone and Black Hole Entropy

Abstract

Strings on a Cone and Black Hole Entropy

Abstract

Paper Structure

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