We calculate parton and generalized parton distributions in Minkowski space\nusing a scalar propagator with a pair of complex conjugate poles. Correct\nspectral and support properties are obtained only after careful analytic\ncontinuation from Euclidean space. Alternately the quark distribution function\n...
Associated with the notion of the transposed matrix is itscomplex conjugateknown to physicists as the adjoint matrix .───跟转置矩阵记号相联系的是它的复共轭矩阵,物理学家称之为伴矩阵。 A Correcting Method To Eliminate Unwished Pairing Complex-conjugate Poles───一种消除不满意共轭复数极点的校正...
Noun1.complex conjugate- either of two complex numbers whose real parts are identical and whose imaginary parts differ only in sign complex number,complex quantity,imaginary,imaginary number- (mathematics) a number of the form a+bi where a and b are real numbers and i is the square root of...
In this paper the analysis for bandwidth extension of Transimpedance amplifiers using inductive feedback based on the characteristics of complex conjugate poles has been done in details. The circuit achieves a 3-dB bandwidth of around 30GHz in the presence of a 50fF photodiode capacitance and 5fF...
共轭复数的英文是什么 共轭复数用英语怎么说 共轭复数怎么读 拼音:,拼音 [gòng è fù shù] 共轭复数翻译:共轭复数的英文 conjugate complex,共轭复数也可以翻译为 conjugate complex numbers,还可以用 conjugate complex number 表示共轭复数。 共轭复数的意思 共轭复数的翻译 共轭复数的解释 共轭复数的发音 共轭复数...
We give an analytical proof that the reflection positivity is violated for any choice of the parameters in the massive Yang–Mills model, due to the existence of a pair of complex conjugate poles and the negativity of the spectral function for the gluon propagator to one-loop order. The ...
of the multiplier matrix can be permitted to have complex conjugate poles and zeros whon the non-linearities possess at least a restricted odd asymmetry... Davies, M. S - 《International Journal of Control》 被引量: 21发表: 1968年 -Domain Orthonormal Basis Functions for Physical System Identif...
If it is complex, then the eigenvalue at J(k1+1,k1+1) is its complex conjugate. We can form the square matrix T such that 1. If the eigenvalue at J(k,k) is real, then the diagonal element T(k,k)=1.0. 2. If the eigenvalue at J(k,k) is complex and eigenvalue J(k+1,...
The values Vr are determined using the Prony method; the eigenvalues λr appear in complex conjugate pairs, and so do the values Vr; therefore there exists a polynomial Vr of order U with real coefficients βn such that (3.51)β0+β1Vr+β2Vr2+…+βUVrU=0. By multiplication of both ...
Observe that \xi _1 (resp., \xi _2) lie in the trace field \mathbb {Q}(\sqrt{-3}) (resp., its complex conjugate) of the \textbf{4}_1 knot, where \mathbb {Q}(\sqrt{-3}) is a subfield of the complex numbers with \sqrt{-3} taken to have positive imaginary part....