We construct and study an $H$-space multiplication on ${mathcal {R}}^+(M)$ for manifolds $M$ which are nullcobordant in their own tangential $2$-type. This is applied to give a rigidity criterion for the action of the diffeomorphism group on ${mathcal {R}}^+(M)$ via pullback. We also compare this to other known multiplicative structures on ${mathcal {R}}^+(M)$.
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