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When manipulating B-splines in this manner, it is often convenient to fall back on the definitions. Luckily, since Mathematica supplies the function BSplineBasis[], using the definitions are easy: pts = {{0, 0}, {1, 1}, {2, -1}, {3, 0}, {4, -2}, {5, 1}}; n = 3; (* B-spline degree *) m = Length[pts]; (* clamped uniform knots for B-spline *) knots = ...

One approach is to turn your expression into functions. I give a few extra variations just to show what can be done and which you might find useful to learn. Here's the whole thing as a function (to be used, for example, in your Plot3D): Bfn = Evaluate[B /. {x -> #1, y -> #2}] &; Bfn[x, y] == B (* True *) Component functions can be ...

You can perform a replace: B[[2,3]]/.{x->-1,y->0} If you have a table of x and y values (call it xyvals) for given matrix elements then you could do: Table[B[[m,n]]/.{x->xyvals[[m,n,1]],y->xyvals[[m,n,2]]},{m,Length[B]},{n,Length[B[[1]]]}]