Boundary critical behaviour at m-axial Lifshitz points: the special transition for the case of a surface plane parallel to the modulation axes
Abstract
The critical behaviour of d-dimensional semi-infinite systems with n-component order parameter φ is studied at an m-axial bulk Lifshitz point whose wave-vector instability is isotropic in an m-dimensional subspace of Rd. Field-theoretic renormalization group methods are utilised to examine the special surface transition in the case where the m potential modulation axes, with 0≤ m≤ d-1, are parallel to the surface. The resulting scaling laws for the surface critical indices are given. The surface critical exponent η\| sp, the surface crossover exponent and related ones are determined to first order in ε=4+m2-d. Unlike the bulk critical exponents and the surface critical exponents of the ordinary transition, is m-dependent already at first order in ε. The (ε) term of η\| sp is found to vanish, which implies that the difference of β1 sp and the bulk exponent β is of order ε2.
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