I am just learning about classical algebras and bialgebras and I'm now reading about the coproduct $\Delta':T(V)\to T(V)\bigotimes T(V) $. My question is about the algebra $T(V)\bigotimes T(V)$. Its elements are sums of elements that look like $$v_1v_2...v_n\bigotimes v_1'v_2'...v_m'$$ but as I have understood it $v_1v_2...v_n$ is just short for $$v_1\bigotimes v_2\bigotimes ... \bigotimes v_n$$ so could we write the element $v_1v_2...v_n\bigotimes v_1'v_2'...v_m'$ as $v_1v_2...v_nv_1'v_2'...v_m'$ or do we need to keep track of "which" tensor product is used where?
Thankful for any help=)
You need to keep track of the two different tensor products. For example $v_1\otimes v_2v_3$ is different from $v_1v_2\otimes v_3$.