In a
non-Abelian Yang–Mills symmetry, where and are flavor-current and axial-current 0th components (charge densities), respectively, the paradigm of a current algebra is : \bigl[\ V^a(\vec{x}),\ V^b(\vec{y})\ \bigr] = i\ f^{ab}_c\ \delta(\vec{x}-\vec{y})\ V^c(\vec{x})\ , and : \bigl[\ V^a(\vec{x}),\ A^b(\vec{y})\ \bigr] = i\ f^{ab}_c\ \delta(\vec{x} - \vec{y})\ A^c(\vec{x})\ ,\qquad \bigl[\ A^a(\vec{x}),\ A^b(\vec{y})\ \bigr] = i\ f^{ab}_c\ \delta(\vec{x} - \vec{y})\ V^c(\vec{x}) ~, where are the structure constants of the
Lie algebra. To get meaningful expressions, these must be
normal ordered. The algebra resolves to a direct sum of two algebras, and , upon defining : L^a(\vec{x})\equiv \tfrac{1}{2}\bigl(\ V^a(\vec{x}) - A^a(\vec{x})\ \bigr)\ , \qquad R^a(\vec{x}) \equiv \tfrac{1}{2}\bigl(\ V^a(\vec{x}) + A^a(\vec{x})\ \bigr)\ , whereupon \bigl[\ L^a(\vec{x}),\ L^b(\vec{y})\ \bigr]= i\ f^{ab}_c\ \delta(\vec{x}-\vec{y})\ L^c(\vec{x})\ ,\quad \bigl[\ L^a(\vec{x}),\ R^b(\vec{y})\ \bigr] = 0, \quad \bigl[\ R^a(\vec{x}),\ R^b(\vec{y})\ \bigr] = i\ f^{ab}_c\ \delta(\vec{x}-\vec{y})\ R^c(\vec{x})~. ==Conformal field theory==