composite operator
Norm Comparison Inequalities for the Composite Operator
... homotopy operator and the projection operator applied to di ff erential forms satisfying the A-harmonic ...the composite operator in terms of the L s ...
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Three loop MS renormalization of the Curci–Ferrari model and the dimension two BRST invariant composite operator in QCD
... = 0 one has QCD fixed in a nonlinear gauge which unlike the Curci- Ferrari model is a unitary theory. The presence of the non-zero mass in (1) breaks both unitarity and the nilpotency of the BRST transformation, [18, 19, ...
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One loop <mml:math altimg="si1.gif" overflow="scroll" xmlns:xocs="http://www.elsevier.com/xml/xocs/dtd" xmlns:xs="http://www.w3.org/2001/XMLSchema" xmlns:xsi="http://www.w3.org/2001/XMLSchema-instance" xmlns="http://www.elsevier.com/xml/ja/dtd" xmlns:ja="http://www.elsevier.com/xml/ja/dtd" xmlns:mml="http://www.w3.org/1998/Math/MathML" xmlns:tb="http://www.elsevier.com/xml/common/table/dtd" xmlns:sb="http://www.elsevier.com/xml/common/struct-bib/dtd" xmlns:ce="http://www.elsevier.com/xml/common/dtd" xmlns:xlink="http://www.w3.org/1999/xlink" xmlns:cals="http://www.elsevier.com/xml/common/cals/dtd"><mml:mover><mml:mi mathvariant="normal">MS</mml:mi><mml:mo>¯</mml:mo></mml:mover></mml:math> gluon pole mass from the local composite operator formalism
... physical operator, which is the minimization of A 2 µ over all gauge configurations [12, 17, ...18].This operator, albeit non-local, reduces to a local operator in the Landau gauge and it is solely ...
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Some Orlicz norms inequalities for the composite operator T ∘ d ∘ H
... In this section, we first present some definitions of elementary conceptions, including Orlicz norms, the Young function, and the A(a, b, g; Θ )-weight, then propose the local estimate for the composite ...
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Lipschitz and BMO norm inequalities for the composite operator on differential forms
... the composite operator acting on dif- ferential forms. Operator theory plays a critical role in investigating the properties of the solutions to partial differential ...The operator theory for ...
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Imbedding inequalities for the composite operator in the Sobolev spaces of differential forms
... is attractive to estimate the sharp value of α(p). In the previous section, we have obtained the local imbedding inequalities for the composite operator. In this section, we prove the global results in the ...
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Orlicz norm inequalities for the composite operator and applications
... projection operator and Green’s ...homotopy operator for differential forms was first introduced in ...linear operator K y : C ∞ (∧ k D) ® C ∞ (∧ k-1 ...
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Renormalizability of the local composite operator Aμ2 in linear covariant gauges
... where b a stands for the Lagrange multiplier and α is the gauge parameter. Our aim is that of establishing some necessary requirements in order to study the possible condensation of this operator, which would ...
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Dynamical gluon mass generation from in linear covariant gauges
... the operator A 2 µ is not even BRST invariant on-shell in these gauges, it is still renor- malizable to any order in perturbation theory ...the composite operator A 2 µ does not mix into the ...
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The anomalous dimension of the gluon-ghost mass operator in Yang–Mills theory
... local composite operators technique [3, 7], resulting in a dynamical mass ...local composite operator related to the condensate, which is fundamental to obtaining its anomalous ...gluon-ghost ...
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Two loop effective potential for langleA2μrangle in the Landau gauge in quantum chromodynamics
... suggest that it has to be positive for a bounded potential and clearly this cannot occur in the case of quantum electrodynamics, (QED). Moreover, there has been renormalization group studies of the relation of this ...
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Inequalities for the composition of Green’s operator and the potential operator
... potential operator P applied to differential ...Green’s operator and the potential operator are of considerable importance in the study of potential theory and nonlinear elasticity; see [–] for more ...
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Ontology of Mutation Testing for Java Operators
... Abstract —Operators are special characters within the Java language to manipulate primitive data type. Java operators can be classified as unary, binary and ternary. The design of Java operator sometimes becomes ...
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Edge Detection Algorithm Based on the Top hat Operator
... The traditional morphological Top-hat operators use the same structural elements to complete the opening and closing operations, they have no effects on the suppression of noise, and they will lead to the lack of edge ...
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Common fixed point theorems for generalized JH operator classes and invariant approximations
... Then C(f, T) = {0, 2} and PC(f, T) = {3, 5}. Obvious (f, T) is a generalized J H -opera- tor with order n ≥ 2 but not a J H -operator and so not a occasionally weakly compati- ble and not weakly compatible. ...
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Geometric properties for integro differential operator involving the pre Schwarzian derivative
... of operators. These operators are playing an important role in geometric func- tion theory to impose new generalized subclasses of analytic univalent and then study their properties. By utilizing the method of ...
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Improving productivity through line balancing : a case study
... • Transfer work task of operator 26 (lens screwing) to operator 25 (lens fixing), and operator 25 would take over the entire combined work tasksv. • Eliminate operator 29 (screwing), and[r] ...
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The Replace Operator
... We provide a simple declarative definition for it, easily expressed in terms of the other regular expression operators, and extend it to the conditional case providing four ways to const[r] ...
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A numerical study for evolution of the real time for pure gauge theory in quantum mechanics (gluons without quarks) with group su (2)
... Hamilton operator , the study of pure gauge theory with group SU(2) becomes a form of quantum mechanics with group SU(2), This mean that the study of infinite number of particles and freedom degrees (quarks and ...
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Lecture 19-20_updated
... • The –> pointer operator, also called the class member access. operator, is considered a unary operator when overloading[r] ...
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