Deconfined critical point in a doped random quantum Heisenberg magnet

We describe the phase diagram of electrons on a fully connected lattice with random hopping, subject to a random Heisenberg spin exchange interactions between any pair of sites and a constraint of no double occupancy. A perturbative renormalization group analysis yields a critical point with fractionalized excitations at a non-zero critical value $p_c$ of the hole doping $p$ away from the half-filled insulator. We compute the renormalization group to two loops, but some exponents are obtained to all loop order. We argue that the critical point $p_c$ is flanked by confining phases: a disordered Fermi liquid with carrier density $1+p$ for $p>p_c$, and a metallic spin glass with carrier density $p$ for $p

Keywords:

• Quantum critical point
• Critical value
• Special unitary group
• Spin glass
• Renormalization group
• Condensed matter physics
• Quantum mechanics
• Physics
• Critical point (thermodynamics)
• Fermi liquid theory
• Critical phenomena

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