The most basic of all the decompositions is the Iwasawa decomposition, which we introduce in the first section. The section computes appropriate Haar measures and Jacobians for the Iwasawa decomposition. For more similar Haar measure computations, see Chapter V, 搂3. In 搂3 we consider the ...
必应词典为您提供iwasawa-decomposition的释义,网络释义: 岩泽分解;伊娃沙娃分解;
When G is a split real form, the foliations induced from the Iwasawa decomposition are actually Lagrangian fibrations with a global transverse Lagrangian section. 展开 关键词: Coadjoint orbit Iwasawa decomposition Isotropic foliation Lagrangian fibration Cartan subalgebra Conjugacy class DOI: 10.1007/s...
关键词:李群;李代数;抛物子群;Haar测度 中图分类号:O174.5;O152.5文献标识码:A文章编 号:0253—374X(2007)07—0980—03 HaarMeasure’SExplicitFormulaof1wasawaDecompositionon AutomorphismGroupof2ndSiegelDomain ZHUXiaolin一.LUHong’u~n (1.I)eparlxnentofMathematics,TongjiUniverstiy,Shangh~200092,China; ...
AB - Let $G$ be a semisimple Lie group with finite center, and let $G = NAK$ be the Iwasawa decomposition of $G$. Using a Riemannian metric constructed from the Killing form and a Cartan involution, one can formulate the heat equation $Δu =frac{partial u}{partial t}$ on $NA$....
j for any σ∈ Gal(L/K). Thus, σ(x) / ∈ O K ∩ ℘ j = ℘, a contradiction. Definition 2.7. Let p be a prime of O L . The subgroup D p = {σ∈ Gal(L/K) : σ(p) = p} is called the decomposition group of p over K.相关...
Applying these maps to the Kato zeta elements gives a decomposition of the (generally unbounded) p-adic L-functions of f into linear combinations of two power series of bounded coefficients, generalizing works of Pollack (in the case a_p=0) and Sprung (when f corresponds to a supersingular ...
constant mean curvatureIwasawa decompositionIn the limit of infinite Newton constant, the 1 +NiedermaierUnivMaxUnivClassical and Quantum Gravity: An Interan... Niedermaier,Max - 《Classical & Quantum Gravity An Interantional Journal of Gravity Geometry of Field Theories Supergravity Cosmology》 被引量...
However, there exist examples where the decomposition condition from Theorem 1.1 is known to be weaker than considering only Zp-extensions K∞ of K which satisfy Sram(K∞/K)=Sp. For example, the conditions from Theorem 1.1 are satisfied for any Zp-extension of an imaginary quadratic number ...
Iwasawa decomposition of affine Kac–Moody algebras using Satake diagrams We carry out the Iwasawa decomposition of the affine Kac–Moody algebras within the general framework of involutive automorphisms which are determined with... KC Pati,D Parashar - 《Journal of Mathematical Physics》 被引量: 23...