Abstract
A sequence of canonical conservation laws for all the Adler–Bobenko–Suris (ABS) equations is derived and is employed in the construction of a hierarchy of master symmetries for equations H1–H3, Q1–Q3. For the discrete potential and Schwarzian KdV equations it is shown that their local generalized symmetries and nonlocal master symmetries in each lattice direction form centerless Virasoro-type algebras. In particular, for the discrete potential KdV, the structure of its symmetry algebra is explicitly given. Interpreting the hierarchies of symmetries of equations H1–H3, Q1–Q3 as differential–difference equations of Yamilov’s discretization of Krichever–Novikov equation, corresponding hierarchies of master symmetries along with isospectral and nonisospectral zero curvature representations are derived for all of them.
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