2 added 1 characters in body edited Jun 16 '11 at 14:39 Gavin Simpson 73.4k6106199 Why don't you use an additive model for this? Package mgcv will handle this sort of model, if I understand you your Question, just fine. I might have this wrong, but the code you show is relating x ~ y, but your Question mentions z ~ s(x, y) + g. What I show below for `gam()` is for response `z` modelled by a spatial smooth in `x` and `y` with `g` being estimated parametrically, with `g` stored as a factor in the data frame: ``````require(mgcv) m <- gam(z ~ s(x,y) + g, data = foo) `````` Or have I misunderstood what you wanted? If you want to post a small snippet of data I can give a proper example using mgcv...? Why don't you use an additive model for this? Package mgcv will handle this sort of model, if I understand you Question, just fine. I might have this wrong, but the code you show is relating x ~ y, but your Question mentions z ~ s(x, y) + g. What I show below for `gam()` is for response `z` modelled by a spatial smooth in `x` and `y` with `g` being estimated parametrically, with `g` stored as a factor in the data frame: ``````require(mgcv) m <- gam(z ~ s(x,y) + g, data = foo) `````` Or have I misunderstood what you wanted? If you want to post a small snippet of data I can give a proper example using mgcv...? Why don't you use an additive model for this? Package mgcv will handle this sort of model, if I understand your Question, just fine. I might have this wrong, but the code you show is relating x ~ y, but your Question mentions z ~ s(x, y) + g. What I show below for `gam()` is for response `z` modelled by a spatial smooth in `x` and `y` with `g` being estimated parametrically, with `g` stored as a factor in the data frame: ``````require(mgcv) m <- gam(z ~ s(x,y) + g, data = foo) `````` Or have I misunderstood what you wanted? If you want to post a small snippet of data I can give a proper example using mgcv...? 1 answered Jun 16 '11 at 14:08 Gavin Simpson 73.4k6106199 Why don't you use an additive model for this? Package mgcv will handle this sort of model, if I understand you Question, just fine. I might have this wrong, but the code you show is relating x ~ y, but your Question mentions z ~ s(x, y) + g. What I show below for `gam()` is for response `z` modelled by a spatial smooth in `x` and `y` with `g` being estimated parametrically, with `g` stored as a factor in the data frame: ``````require(mgcv) m <- gam(z ~ s(x,y) + g, data = foo) `````` Or have I misunderstood what you wanted? If you want to post a small snippet of data I can give a proper example using mgcv...?