At low energies, type IIA string theory is described by type IIA supergravity in ten dimensions which is a non-chiral theory (i.e. left–right symmetric) with (1,1) d=10 supersymmetry; the fact that the anomalies in this theory cancel is therefore trivial.

In the 1990s it was realized by Edward Witten (building on previous insights by Michael Duff, Paul Townsend, and others) that the limit of type IIA string theory in which the string coupling goes to infinity becomes a new 11-dimensional theory called M-theory.^[1] Consequently the low energy type IIA supergravity theory can also be derived from the unique maximal supergravity theory in 11 dimensions (low energy version of M-theory) via a dimensional reduction.^[2][3]

The content of the massless sector of the theory (which is relevant in the low energy limit) is given by ${\textstyle (8_{v}\oplus 8_{s})\otimes (8_{v}\oplus 8_{c})}$  representation of SO(8) where ${\displaystyle 8_{v}}$  is the irreducible vector representation, ${\displaystyle 8_{c}}$  and ${\displaystyle 8_{v}}$  are the irreducible representations with odd and even eigenvalues of the fermionic parity operator.^[4] The four sectors of the massless spectrum after GSO projection and decomposition into irreducible representations are ^[2][3][5]

${\displaystyle {\text{NS-NS}}:~~8_{v}\otimes 8_{v}=1\oplus 28\oplus 35=\Phi \oplus B_{\mu \nu }\oplus G_{\mu \nu }}$ 

${\displaystyle {\text{NS-R}}:8_{v}\otimes 8_{c}=8_{s}\oplus 56_{c}=\lambda ^{+}\oplus \psi _{m}^{-}}$ 

${\displaystyle {\text{R-NS}}:8_{c}\otimes 8_{s}=8_{s}\oplus 56_{s}=\lambda ^{-}\oplus \psi _{m}^{+}}$ 

${\displaystyle {\text{R-R}}:8_{s}\otimes 8_{c}=8_{v}\oplus 56_{t}=C_{n}\oplus C_{nmp}}$ 

where ${\displaystyle {\text{R}}}$  and ${\displaystyle {\text{NS}}}$  stands for Ramond and Neveu-Schwarz sectors respectively. The numbers denote the dimension of the irreducible representation and equivalently the number of components of the corresponding fields. The various massless fields obtained are the graviton ${\displaystyle G_{\mu \nu }}$  with two superpartner gravitinos ${\displaystyle \psi _{m}^{\pm }}$  which gives rise to local spacetime supersymmetry,^[3] a scalar dilaton ${\displaystyle \Phi }$  with two superpartner spinors—the dilatinos ${\displaystyle \lambda ^{\pm }}$  , and a 2-form spin-2 gauge field ${\displaystyle B_{\mu \nu }}$  often called the Kalb-Ramond field with superpartners 1-form ${\displaystyle C_{n}}$  and 3-form ${\displaystyle C_{nmp}}$ . Since the ${\displaystyle {\text{p}}}$ -form gauge fields naturally couple to extended objects with ${\displaystyle {\text{p}}}$  dimensional world-volume, Type II-A string theory naturally incorporates various extended objects like D0,D2,D4 and D6 branes (using Hodge duality) among the D-branes and F1 string and NS5 brane among other objects.^[3][4][5]

The mathematical treatment of type IIA string theory belongs to symplectic topology and algebraic geometry, particularly Gromov–Witten invariants.

At low energies, type IIB string theory is described by type IIB supergravity in ten dimensions which is a chiral theory (left–right asymmetric) with (2,0) d=10 supersymmetry; the fact that the anomalies in this theory cancel is therefore nontrivial.

In the 1990s it was realized that type IIB string theory with the string coupling constant g is equivalent to the same theory with the coupling 1/g. This equivalence is known as S-duality.

Orientifold of type IIB string theory leads to type I string theory.

The mathematical treatment of type IIB string theory belongs to algebraic geometry, specifically the deformation theory of complex structures originally studied by Kunihiko Kodaira and Donald C. Spencer.

In 1997 Juan Maldacena gave some arguments indicating that type IIB string theory is equivalent to N = 4 supersymmetric Yang–Mills theory in the 't Hooft limit; it was the first suggestion concerning the AdS/CFT correspondence.^[6]

In the late 1980s, it was realized that type IIA string theory is related to type IIB string theory by T-duality.

• Superstring theory
• Type I string
• Heterotic string