On the integrability of a new lattice equation (Q2926436)

The paper addresses four recently introduced double-discrete solitons (discretized in both the spatial and temporal directions). The objective is to test by means of various techniques the assumed integrability of those equations. One technique is the proof of the confinement of singularities in solutions of these equations. Others include the proof of the fact that the algebraic entropy is zero for the equations under consideration; Miura-type relations; bilinearization and trilinearization. Explicit single- and two-soliton solutions of the equations under consideration are obtained. Continuum limits for all the equations are derived too. In all cases, they amount to the modified Korteweg-de Vries equation, with different combinations of parameters giving its coefficients.