MDPI - Publisher of Open Access Journals

24 pages, 379 KiB

Open AccessArticle

Involutive Symmetries and Langlands Duality in Moduli Spaces of Principal G-Bundles

by Álvaro Antón-Sancho

Symmetry 2025, 17(6), 819; https://doi.org/10.3390/sym17060819 - 24 May 2025

Viewed by 391

Let X be a compact Riemann surface of genus

g \geq 2

, G be a complex semisimple Lie group, and

M_{G} (X)

be the moduli space of stable principal G-bundles. This paper studies the fixed point set of [...] Read more.

Let X be a compact Riemann surface of genus

g \geq 2

, G be a complex semisimple Lie group, and

M_{G} (X)

be the moduli space of stable principal G-bundles. This paper studies the fixed point set of involutions on

M_{G} (X)

induced by an anti-holomorphic involution

τ

on X and a Cartan involution

θ

of G, producing an involution

σ = θ_{*} \circ τ_{*}

. These fixed points are shown to correspond to stable

G_{R}

-bundles over the real curve

(X_{τ}, τ)

, where

G_{R}

is the real form associated with

θ

. The fixed point set

M_{G} {(X)}^{σ}

consists of exactly

2^{r}

connected components, each a smooth complex manifold of dimension

\frac{(g - 1) \dim G}{2}

, where r is the rank of the fundamental group of the compact form of G. A cohomological obstruction in

H^{2} (X_{τ}, π_{1} (G_{R}))

characterizes which bundles are fixed. A key result establishes a derived equivalence between coherent sheaves on

M_{G} {(X)}^{σ}

and on the fixed point set of the dual involution on the moduli space of

G^{\lor}

-local systems, where

G^{\lor}

denotes the Langlands dual of G. This provides an extension of the Geometric Langlands Correspondence to settings with involutions. An application to the Chern–Simons theory on real curves interprets

M_{G} {(X)}^{σ}

as a

(B, B, B)

-brane, mirror to an

(A, A, A)

-brane in the Hitchin system, revealing new links between real structures, quantization, and mirror symmetry. Full article

(This article belongs to the Special Issue Symmetry in Integrable Systems: Topics and Advances)

14 pages, 361 KiB

Open AccessArticle

Langlands Duality and Invariant Differential Operators

by Vladimir Dobrev

Mathematics 2025, 13(5), 855; https://doi.org/10.3390/math13050855 - 4 Mar 2025

Viewed by 611

Abstract

Langlands duality is one of the most influential topics in mathematical research. It has many different appearances and influential subtopics. Yet there is a topic that until now has seemed unrelated to the Langlands program. That is the topic of invariant differential operators. It is strange since both items are deeply rooted in Harish-Chandra’s representation theory of semisimple Lie groups. In this paper we start building the bridge between the two programs. We first give a short review of our method of constructing invariant differential operators. A cornerstone in our program is the induction of representations from parabolic subgroups

P = M A N

of semisimple Lie groups. The connection to the Langlands program is through the subgroup M, which other authors use in the context of the Langlands program. Next we consider the group

S L (2 n, R)

, which is currently prominently used via Langlands duality. In that case, we have

M = S L (n, R) \times S L (n, R)

. We classify the induced representations implementing

P = M A N

. We find out and classify the reducible cases. Using our procedure, we classify the invariant differential operators in this case. Full article

(This article belongs to the Special Issue New Aspects of Differentiable and Not Differentiable Function Theory)

► Show Figures

Figure 1

Search Results (2)

Further Information

Guidelines

MDPI Initiatives

Follow MDPI

Saved Queries

Search Filter Reset All

Years

Feature Papers

Subjects

Journals

Article Types

Countries / Regions

Search Results (2)

Further Information

Guidelines

MDPI Initiatives

Follow MDPI