Thermodynamics of a two-dimensional frustrated spin-1/2 Heisenberg ferromagnet

Abstract

Using the spin-rotation-invariant Green's function method we calculate the thermodynamic quantities (correlation functions <S0 SR>, uniform static spin susceptibility , correlation length , and specific heat CV) of the two-dimensional spin-1/2 J1-J2 Heisenberg ferromagnet for J2 < J2c ≈ 0.44|J1|, where J2c is the critical frustrating antiferromagnetic next-nearest neighbor coupling at which the ferromagnetic ground state gives way for a ground-state phase with zero magnetization. Examining the low-temperature behavior of and , in the limit T 0 both quantities diverge exponentially, i.e., (b/T) and (b/2T), respectively. We find a linear decrease of the coefficient b with increasing frustration according to b=-(π/2)(J1+2J2), i.e., the exponential divergence of and is present up to J2c. Furthermore, we find an additional low-temperature maximum in the specific heat when approaching the critical point, J2 J2c.