alex5
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We know that infinite-dimensional matrix multiplication in general isn't asociative. But, is there any criteria when asociativity is valid?
thanks in advance.
thanks in advance.
mathwonk said:I am puzzled. If multiplying infinite matrices corresponds to composing linear maps, as in the finite dimensional case, then it seems it would be associative, since composition is so.
I guess these matrices do not correspond to linear maps in the algebraic sense, as in that case there would be a finiteness condition on the number of non zero entries in the columns.
mathwonk said:one needs to be a little more precise. in linear algebra, convergence is not an issue, only in analysis.
so one needs to say what subject one is working in, and what one means by "associative".
the matrices you gave do not represent maps in terms of a basis in the linear algebra sense.
mathwonk said:(Is it perhaps Tonelli?)