Figure 3From: Bivariate tensor product \((p, q)\)-analogue of Kantorovich-type Bernstein-Stancu-Schurer operators The figures of \(\pmb{K_{p_{n_{1}},q_{n_{1}},p_{n_{2}},q_{n_{2}}}^{n_{1},n_{2},\alpha,\beta,l}(f;x,y)}\) (the upper one) for \(\pmb{n_{1} = n_{2} = 50}\) , \(\pmb{p_{n_{1}} = p_{n_{2}} = 1 - 1/10^{14}}\) , \(\pmb{q_{n_{1}} = q_{n_{2}} = 0.9999}\) , \(\pmb{l=1}\) , \(\pmb{\alpha=3}\) , \(\pmb{\beta=2}\) and \(\pmb{f(x,y)=x^{2}y^{2}}\) (the below one). Back to article page