L-packet
In the field of mathematics known as representation theory, an L-packet is a collection of (isomorphism classes of) irreducible representations of a reductive group over a local field, that are L-indistinguishable, meaning they have the same Langlands parameter, and so have the same L-function and ε-factors. L-packets were introduced by Robert Langlands in (Langlands 1989), (Langlands & Labesse 1979) .
The classification of irreducible representations splits into two parts: first classify the L-packets, then classify the representations in each L-packet. The local Langlands conjectures state (roughly) that the L-packets of a reductive group G over a local field F are conjecturally parameterized by certain homomorphisms of the Langlands group of F to the L-group of G, and Arthur has given a conjectural description of the representations in a given L-packet.
The elements of an L-packet[]
For irreducible representations of connected complex reductive groups, Wallach proved that all the L-packets contain just one representation. The L-packets, and therefore the irreducible representations, correspond to quasicharacters of a Cartan subgroup, up to conjugacy under the Weyl group.
For general linear groups over local fields, the L-packets have just one representation in them (up to isomorphism).
An example of an L-packet is the set of discrete series representations with a given infinitesimal character and given . For example, the discrete series representations of SL2(R) are grouped into L-packets with two elements.
Arthur (2006) gave a conjectural parameterization of the elements of an L-packet in terms of the connected components of C/Z, where Z is the center of the L-group, and C is the centralizer in the L-group of Im(φ), and φ is the homomorphism of the Langlands group to the L-group corresponding to the L-packet. For example, in the general linear group, the centralizer of any subset is Zariski connected, so the L-packets for the general linear group all have 1 element. On the other hand, the centralizer of a subset of the projective general linear group can have more than 1 component, corresponding to the fact that L-packets for the special linear group can have more than 1 element.
References[]
- Arthur, James (2006), "A note on L-packets" (PDF), Pure and Applied Mathematics Quarterly, 2 (1): 199–217, doi:10.4310/pamq.2006.v2.n1.a9, ISSN 1558-8599, MR 2217572, archived from the original (PDF) on 2011-10-12, retrieved 2011-07-18
- Labesse, Jean-Pierre; Langlands, R. P. (1979), "L-indistinguishability for SL(2)", Canadian Journal of Mathematics, 31 (4): 726–785, doi:10.4153/CJM-1979-070-3, ISSN 0008-414X, MR 0540902
- Labesse, Jean-Pierre (2008), "Introduction to endoscopy" (PDF), in Arthur, James; Schmid, Wilfried; Trapa, Peter E. (eds.), Representation theory of real reductive Lie groups, Contemp. Math., 472, Providence, R.I.: American Mathematical Society, pp. 175–213, ISBN 978-0-8218-4366-6, MR 2454335
- Langlands, Robert P. (1989) [1973], "On the classification of irreducible representations of real algebraic groups", in Sally, Paul J.; Vogan, David A. (eds.), Representation theory and harmonic analysis on semisimple Lie groups, Math. Surveys Monogr., 31, Providence, R.I.: American Mathematical Society, pp. 101–170, ISBN 978-0-8218-1526-7, MR 1011897
- Langlands program