Bergman projection induced by kernel with integral representation

Bounded Bergman projections $P_\omega:L^p_\omega(v)\to L^p_\omega(v)$, induced by reproducing kernels admitting the representation $$ \frac{1}{(1-\overline{z}\zeta)^\gamma}\int_0^1\frac{d\nu(r)}{1-r\overline{z}\zeta}, $$ and the corresponding (1,1)-inequality are characterized in terms of Bekoll\'e-Bonami-type conditions. The two-weight inequality for the maximal Bergman projection $P^+_\omega:L^p_\omega(u)\to L^p_\omega(v)$ in terms of Sawyer-testing conditions is also discussed.