Abstract
In this paper, we study Onsager’s conjecture on the energy conservation for the isentropic compressible Euler equations via establishing the energy conservation criterion involving the density ϱ∈Lk(0,T;Ll(Td)). The motivation is to analyze the role of the integrability of density in energy conservation of weak solutions in this system, since almost all known corresponding results require ϱ∈L∞(0,T;L∞(Td)). Our results imply that the lower integrability of density ϱ means that more integrability of the velocity v is necessary in energy conservation. The proof relies on the Constantin–Weinan–Titi type and Lions type commutators on the mollifying kernel.
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