Barry Smith <[email protected]> writes: > I'm sorry, I made a small mistake in my previous email. It is > > F'(x) = A(x) + A'(x)x - b'(x) not F'(x) = A(x) + A'(x)x + b'(x)
I find this much easier to write in variational notation: F(x) = A(x) x - b(x) F'(x) dx = A(x) dx + (A'(x) dx) x - b'(x) dx Note that A'(x) is a third order tensor so A'(x) dx is a second order tensor (i.e., a matrix). As such, one never wants to represent A'(x) on its own, or even A'(x) dx for that matter. This is one reason I dislike this notation. For any given example, it's often possible to write the operator dx \mapsto (A'(x) dx) x in an intuitive way, but it can take thought and this tends to be more circuitous than working with F(x) directly.
