Is the sigma-strong topology generated by bounded sets?

Question

Let $V$ be a Banach space and $B(V)$ be the bounded operators on $V$. Now, the space $B(V)$ has a norm, the strong topology (which is the topology of pointwise convergence) and it has a stronger topology called ultrastrong or $\sigma$-strong topology. It is known that these two topologies coincide on norm-bounded sets. I want to know if the $\sigma$-strong topology is the strongest topology which coincides with the strong topology (respectively itself) on bounded sets.

Edit: The $\sigma$-strong topology is a topology generated by certain seminorms. Namely for all sequences $b_n$ with $\sum_n \|b_n\|^2<\infty$, the seminorm $B(V)\times B(V) \to \mathbf{R}$ given by the square root of $(f,g)\mapsto \sum_n \|f(b_n)-g(b_n)\|^2$ should be continuous and these seminorms generate the topology.

Edit: The answer seems to be "no" for this general case. I have no example though. To simplify this question, I removed a second part. Thank you for the helpful comments on both parts.

Answer 1

The finest topology that coincides with $\tau*$ ($\sigma$-strong in this case) on $\tau$-bounded (norm-bounded in this case) subsets is the mixed topology $\gamma(\tau,\tau^*)$, introduced by A. Wiweger, Linear spaces with mixed topology. Studia Mathematica 20 (1961), 47--68; see 2.2.2. For the Hilbert space $\ell_2$ (or perhaps any separable infinite dimensional Banach space?), the inequalities $$\mbox{$\sigma$-strong} \le \mbox{uniform convergence on compact subsets} \le \gamma(\mbox{norm},\mbox{$\sigma$-strong})$$ are strict (Addendum: I'm no longer so sure if the second inequality is strict).

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A note for posterity: I was noticed that there is some confusion in the literature as to the difference of the above topologies. E.g., Proposition I.8.6.3 in Blackadar's book erroneously claims that the $\sigma$-strong topology on $B(H)$ coincides with the strict topology arising as the multiplier of $K(H)$. The essentially same claim is seen in Chapter 8 in Lance's book. In fact, these topologies are different (although they coincide on norm bounded subsets, and that's what's needed in daily life), as the following example shows.

Take a sequence of mutually orthogonal rank one orthogonal projections $p_n$ on a separable Hilbert space $H$. Then, the $\sigma$-strong closure of $\{ \sqrt{n} p_n \}$ contains $0$. Indeed, for any positive linear functional $f$ on $B(H)$, one has $\liminf_n f(n p_n)=0$, for otherwise $f(p_n)>\frac{\epsilon}{n}$ for all $n$ and $\lim_m f(\sum_{n=1}^m p_n)=\infty$, a contradiction. However, $T:=\sum_{n=1}^\infty \frac{1}{\sqrt{n}}p_n \in K(H)$ (or the compact subset $\{ Tv : \|v\|\le1\})$ separates $0$ from $\{ \sqrt{n} p_n \}$ in the strict topology (or the compact open topology).