六维N = 20共形理论的无张力弦场理论研究进展

12 浏览量更新于2024-07-16 收藏 733KB PDF 举报

迈向无张力弦场理论，计算d = 6中的N = 20 $$ \mathcal{N} = \left(2,0 \right)$$ CFT 在这篇论文中，我们将讨论使用无张力弦场理论来描述六维N = 20 $$ \mathcal{N} = \left(2,0 \right)$$共形理论的Lagrangian。无张力弦场理论是指弦场理论中弦的张力为零的特殊情况，这种理论可以用来描述高能物理过程中的一些特性。首先，我们构造了理论的自由部分，这部分描述了理论中的自由度。自由度是指理论中的基本粒子，可以是 scalar、fermion 或vector 等。然后，我们为光锥超空间中的三次顶点提出了ansatz。ansatz是指用来描述理论中的交互作用的数学表达式。在这里，我们使用ansatz来描述三次顶点的交互作用。接下来，我们使用(2,0)超对称代数来固定三次顶点的参数。超对称代数是指在理论中的对称性，它可以用来描述理论中的对称性。在这里，我们使用超对称代数来固定三次顶点的参数，以便更好地描述理论中的交互作用。最后，我们讨论了论文中的结果，包括理论的自由部分和三次顶点的ansatz。我们还讨论了使用无张力弦场理论来描述六维N = 20 $$ \mathcal{N} = \left(2,0 \right)$$共形理论的优点和挑战。无张力弦场理论是一种描述高能物理过程的有力工具，它可以用来描述一些复杂的物理过程。但是，这种理论也存在一些挑战，例如如何固定理论中的参数和如何描述理论中的交互作用。这篇论文对无张力弦场理论的研究具有重要的理论价值和实践意义。在论文的结尾，我们讨论了论文的结果和未来研究方向。我们认为，无张力弦场理论是一种有前途的理论，它可以用来描述一些复杂的物理过程。但是，理论还需要进一步的发展和完善，以便更好地描述物理世界。在论文的最后，我们感谢所有参与论文的作者和机构。我们也感谢 Springer 出版社对论文的出版。

JHEP07(2018)135

3.1 Chiral derivatives, supersymmetry and level-matching

There are two diﬀerent formulations of supersymmetric theories in terms of light-cone

superﬁelds. In one approach, one uses superﬁelds which depend only on θ (or

θ). For

N = 4 SYM in four dimensions, this approach was introduced in [23]. The formulation of

spacetime supersymmetric SFT by Green, Schwarz and Brink [47–50] also belongs to this

class of models. In the other approach, one uses superﬁelds depending on both θ and

θ,

and certain chirality constraints are imposed, as was done for N = 4 SYM in [45]. While

the former choice has the advantage of being direct, in the latter, formulae for the charges

and the power-counting procedure [70] are more transparent because fermionic coordinates

enter in supercovariant combinations.

We adopt the latter approach. Our superﬁelds depend on both θ and

θ, i.e. θ

and

. We impose the fundamental chirality constraint on our superﬁeld for each value of σ,

(σ)φ = 0 , (3.5)

where the chiral derivative is deﬁned by

(σ) =

δθ

(σ)

√

(σ)

. (3.6)

is deﬁned in appendix A.

One can solve the constraint (3.5),

, θ,

θ) = e

√

dσ

θ) . (3.7)

Here Ψ is an arbitrary superﬁeld depending only on

θ, which can be identiﬁed with the

superﬁeld in an approach analogous to [23, 47–50].

The superstring ﬁeld is a natural extension of the superﬁeld for a superparticle in

six-dimensional spacetime constructed in [65, 66]. If one focusses on the dependence of

the string ﬁeld on the zero-mode part of x(σ) and θ(σ), one obtains the superﬁeld for the

superparticle (for each value of the index I). The superﬁeld corresponds to the tensor

multiplet [67] of (2, 0) supersymmetry, and gives the light-cone superﬁeld corresponding

to the N = 4 SYM theory in four-dimensions [45] upon dimensional reduction. This

gives additional support to our idea that the superstring ﬁeld is a natural choice for the

construction of the (2, 0) theory.

In particular, it incorporates the self-duality property

of the theory, because the tensor multiplet includes a two-form gauge ﬁeld with self-dual

ﬁeld strength. Although our formulation is based on closed string DOF, it is nevertheless

non-gravitational since the tensor multiplet does not contain any ﬁeld of spin 2.

We introduce the local supersymmetry generator

(σ) =

δθ

(σ)

−

√

(σ)

, (3.8)

In the degenerate case of a single M5-brane [71], the (2, 0) CFT is conventionally believed to be a free

theory of ﬁelds belonging to the tensor multiplet. Putting N = 1 in our case also leads to a free theory with

very many light degrees of freedom including the tensor multiplet associated with the zero mode. There is

no immediate contradiction here since, being free, these ﬁelds are completely decoupled.

– 7 –

剩余44页未读，继续阅读

weixin_38568548

粉丝: 4
资源: 901

六维N = 20共形理论的无张力弦场理论研究进展

关于4d的约简N = 1 $$ \ mathcal {N} = 1 $$关于S 2 $$的理论{\ mathbb {S}} ^ 2 $$

N = 0的重力对偶，2 $$ \ mathcal {N} = \ left（0，\ 2 \ right）$$ SCFTs from M5-branes

N = 8 $$ \ mathcal {N} = 8 $$和N = 4 $$ \ mathcal {N} = 4 $$弦论的精确全息和黑洞熵

求解如下递归方程T(1)=1，n=1;4T(n/2)+n^2

积分变换法可以求解常微分方程的例子

$$p(\boldsymbol{\theta}, \sigma^2|\mathcal{D}) \propto p(\mathcal{D}|\boldsymbol{\theta}, \sigma^2)p(\boldsymbol{\theta}, \sigma^2)$$转为word

如何用极大似然估计来估计一组时间序列的维纳过程参数，用matlab实现

1. 证明：在0-1损失函数条件下的最小风险贝叶斯决策等价于最小错误率贝叶斯。

最新资源