L^p sum

Let ${\displaystyle (X_{i})_{i\in I}}$  be a family of Banach spaces, where ${\displaystyle I}$  may have arbitrarily large cardinality. Set $${\displaystyle P:=\prod _{i\in I}X_{i},}$$  the product vector space.

The index set ${\displaystyle I}$  becomes a measure space when endowed with its counting measure (which we shall denote by ${\displaystyle \mu }$ ), and each element ${\displaystyle (x_{i})_{i\in I}\in P}$  induces a function $${\displaystyle I\to \mathbb {R} ,i\mapsto \|x_{i}\|.}$$ 

Thus, we may define a function $${\displaystyle \Phi :P\to \mathbb {R} \cup \{\infty \},(x_{i})_{i\in I}\mapsto \int _{I}\|x_{i}\|^{p}\,d\mu (i)}$$  and we then set $${\displaystyle \sideset {}{^{p}}\bigoplus \limits _{i\in I}X_{i}:=\{(x_{i})_{i\in I}\in P\mid \Phi ((x_{i})_{i\in I})<\infty \}}$$  together with the norm $${\displaystyle \|(x_{i})_{i\in I}\|:=\left(\int _{i\in I}\|x_{i}\|^{p}\,d\mu (i)\right)^{1/p}.}$$ 

The result is a normed Banach space, and this is precisely the L^p sum of ${\displaystyle (X_{i})_{i\in I}.}$ 

• Whenever infinitely many of the ${\displaystyle X_{i}}$  contain a nonzero element, the topology induced by the above norm is strictly in between product and box topology.
• Whenever infinitely many of the ${\displaystyle X_{i}}$  contain a nonzero element, the L^p sum is neither a product nor a coproduct.