Tensor Product CFTs and One-Character Extensions

Abstract

We study one-character CFTs obtained as one-character extensions of the tensor products of a single CFT C. The motivation comes from the fact that 28 of the 71 CFTs in the Schelleken's list of c = 24 CFTs are such CFTs. We study for C : (i) any two-character WZW CFT with vanishing Wronskian index, (ii) the Ising CFT, (iii) the infinite class of Dr,1 CFTs and the A4,1 CFT. The characters being S-invariant homogenous polynomials of the characters of C, when organised in terms of a S-invariant basis, take compact forms allowing for closed form answers for high central charges. We find a S-invariant basis for each of the CFTs studied. As an example, one can find an explicit expression for the character of the monster CFT as a degree-48 polynomial of the characters of the Ising CFT. In some CFTs, some of the S-invariant polynomials of characters compute, after using the q-series of the characters, to a constant value. Hence, the characters of one-character extensions are more properly elements of the quotient ring of polynomials (of characters) with the ideal needed for the quotient, generated by S-invariant polynomials that compute to a constant. In some cases, we are able to rule out the existence of one-character extension CFTs. In other cases, we predict their existence. We are able to conjecture a discrete set of six and four infinite series of one-character extension CFTs.

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