Corrections to finite-size scaling in the φ4 model on square lattices

Corrections to scaling in the two-dimensional (2D) scalar φ4 model are studied based on nonperturbative analytical arguments and Monte Carlo (MC) simulation data for different lattice sizes L (4≤L≤1536) and different values of the φ4 coupling constant λ, i.e. λ=0.1, 1, 10. According to our analysis, amplitudes of the nontrivial correction terms with the correction–to–scaling exponents ωℓ<1 become small when approaching the Ising limit (λ→∞), but such corrections generally exist in the 2D φ4 model. Analytical arguments show the existence of corrections with the exponent 3∕4. The numerical analysis suggests that there exist also corrections with the exponent 1∕2 and, perhaps, also with the exponent about 1∕4, which are detectable at λ=0.1. The numerical tests provide an evidence that the structure of corrections to scaling in the 2D φ4 model differs from the usually expected one in the 2D Ising model.