The effective exponent gamma(Q) and the slope of the beta function
classification
✦ hep-ph
hep-th
keywords
gammaexponentbetaeffectivefixed-pointfunctioninvariantlimit
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The slope of the beta function at a fixed point is commonly thought to be RG invariant and to be the critical exponent gamma* that governs the approach of any physical quantity R to its fixed-point limit: R*-R proportional to Q^gamma*. Chyla has shown that this is not quite true. Here we define a proper RG invariant, the "effective exponent" gamma(Q), whose fixed-point limit is the true gamma*.
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