Takeshi Oota scite author profile

The type IIA/IIB effective actions compactified on T d are known to be invariant under the T -duality group SO(d, d; Z), although the invariance of the R-R sector cannot be seen so directly. Inspired by a work of Brace, Morariu and Zumino, we introduce new potentials, which are mixtures of R-R potentials and the NS-NS 2-form, in order to make the invariant structure of R-R sector more transparent. We give a simple proof that if these new potentials transform as a Majorana-Weyl spinor of SO (d, d; Z), the effective actions are indeed invariant under the T -duality group. The argument is made in such a way that it can apply to Kaluza-Klein forms of arbitrary degree. We also demonstrate that these new fields simplify all the expressions, including the Chern-Simons term. * )

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Separability of Dirac equation in higher dimensional Kerr–NUT–de Sitter spacetime

Oota

Yasui

2008

Physics Letters B

137

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Kerr–NUT–de Sitter curvature in all dimensions

Hamamoto¹,

Houri²,

Oota³

et al. 2007

J. Phys. A: Math. Theor.

130

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Method of generating q-expansion coefficients for conformal block and N=2 Nekrasov function by β-deformed matrix model

2010

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We observe that, at β-deformed matrix models for the four-point conformal block, the point q = 0 is the point where the three-Penner type model becomes a pair of decoupled two-Penner type models and where, in the planar limit, (an array of) two-cut eigenvalue distribution(s) coalesce into (that of) one-cut one(s). We treat the Dotsenko-Fateev multiple integral, with their paths under the recent discussion, as perturbed double-Selberg matrix model (at q = 0, it becomes a pair of Selberg integrals) to construct two kinds of generating functions for the q-expansion coefficients and compute some. A formula associated with the Jack polynomial is noted. The second Nekrasov coefficient for SU(2) with N f = 4 is derived. A pair of Young diagrams appears naturally. The finite N loop equation at q = 0 as well as its planar limit is solved exactly, providing a useful tool to evaluate the coefficients as those of the resolvents.The planar free energy in the q-expansion is computed to the lowest non-trivial order. A free field representation of the Nekrasov function is given. *

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Closed conformal Killing–Yano tensor and Kerr–NUT–de Sitter space–time uniqueness

2007

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Takeshi Oota

Comments on T-Dualities of Ramond-Ramond Potentials

Separability of Dirac equation in higher dimensional Kerr–NUT–de Sitter spacetime

Kerr–NUT–de Sitter curvature in all dimensions

Method of generating q-expansion coefficients for conformal block and N=2 Nekrasov function by β-deformed matrix model

Closed conformal Killing–Yano tensor and Kerr–NUT–de Sitter space–time uniqueness

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