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Given a full right-Hilbert 
$\mathrm {C}^{*}$-module 
$\mathbf {X}$ over a 
$\mathrm {C}^{*}$-algebra A, the set 
$\mathbb {K}_{A}(\mathbf {X})$ of A-compact operators on 
$\mathbf {X}$ is the (up to isomorphism) unique 
$\mathrm {C}^{*}$-algebra that is strongly Morita equivalent to the coefficient algebra A via 
$\mathbf {X}$. As a bimodule, 
$\mathbb {K}_{A}(\mathbf {X})$ can also be thought of as the balanced tensor product 
$\mathbf {X}\otimes _{A} \mathbf {X}^{\mathrm {op}}$, and so the latter naturally becomes a 
$\mathrm {C}^{*}$-algebra. We generalize both of these facts to the world of Fell bundles over groupoids: Suppose 
$\mathscr {B}$ is a Fell bundle over a groupoid 
$\mathcal {H}$ and 
$\mathscr {M}$ is an upper semi-continuous Banach bundle over a principal 
$\mathcal {H}$-space X. If 
$\mathscr {M}$ carries a right-action of 
$\mathscr {B}$ and a sufficiently nice 
$\mathscr {B}$-valued inner product, then its imprimitivity Fell bundle 
$\mathbb {K}_{\mathscr {B}}(\mathscr {M})=\mathscr {M}\otimes _{\mathscr {B}} \mathscr {M}^{\mathrm {op}}$ is a Fell bundle over the imprimitivity groupoid of X, and it is the unique Fell bundle that is equivalent to 
$\mathscr {B}$ via 
$\mathscr {M}$. We show that 
$\mathbb {K}_{\mathscr {B}}(\mathscr {M})$ generalizes the “higher order” compact operators of Abadie–Ferraro in the case of saturated bundles over groups, and that the theorem recovers results such as Kumjian’s Stabilization trick.
Given a Polish group G, let 
$E(G)$ be the right coset equivalence relation 
$G^\omega /c(G)$, where 
$c(G)$ is the group of all convergent sequences in G. We first established two results:
(1) Let 
$G,H$ be two Polish groups. If H is TSI but G is not, then 
$E(G)\not \le _BE(H)$.
(2) Let G be a Polish group. Then the following are equivalent: (a) G is TSI non-archimedean; (b)
$E(G)\leq _B E_0^\omega $; and (c) 
$E(G)\leq _B {\mathbb {R}}^\omega /c_0$. In particular, 
$E(G)\sim _B E_0^\omega $ iff G is TSI uncountable non-archimedean.
A critical theorem presented in this article is as follows: Let G be a TSI Polish group, and let H be a closed subgroup of the product of a sequence of TSI strongly NSS Polish groups. If 
$E(G)\le _BE(H)$, then there exists a continuous homomorphism 
$S:G_0\rightarrow H$ such that 
$\ker (S)$ is non-archimedean, where 
$G_0$ is the connected component of the identity of G. The converse holds if G is connected, 
$S(G)$ is closed in H, and the interval 
$[0,1]$ can be embedded into H.
As its applications, we prove several Rigid theorems for TSI Lie groups, locally compact Polish groups, separable Banach spaces, and separable Fréchet spaces, respectively.
$C^*$-ALGEBRAS OF UNSATURATED FELL BUNDLES OVER ÉTALE GROUPOIDS
Consider a possibly unsaturated Fell bundle 
$\mathcal {A}\to G$ over a locally compact, possibly non-Hausdorff, groupoid G. We list four notions of continuity of representations of 
$\mathit {C_c}(G;\mathcal {A})$ on a Hilbert space and prove their equivalence. This allows us to define the full 
$\mathit {C}^*$-algebra of the Fell bundle in different ways.
For a space X let 
$\mathcal {K}(X)$ be the set of compact subsets of X ordered by inclusion. A map 
$\phi :\mathcal {K}(X) \to \mathcal {K}(Y)$ is a relative Tukey quotient if it carries compact covers to compact covers. When there is such a Tukey quotient write 
$(X,\mathcal {K}(X)) \ge _T (Y,\mathcal {K}(Y))$, and write 
$(X,\mathcal {K}(X)) =_T (Y,\mathcal {K}(Y))$ if 
$(X,\mathcal {K}(X)) \ge _T (Y,\mathcal {K}(Y))$ and vice versa.
We investigate the initial structure of pairs 
$(X,\mathcal {K}(X))$ under the relative Tukey order, focussing on the case of separable metrizable spaces. Connections are made to Menger spaces.
Applications are given demonstrating the diversity of free topological groups, and related free objects, over separable metrizable spaces. It is shown a topological group G has the countable chain condition if it is either 
$\sigma $-pseudocompact or for some separable metrizable M, we have 
$\mathcal {K}(M) \ge _T (G,\mathcal {K}(G))$.
Carlsen [‘
$\ast $-isomorphism of Leavitt path algebras over 
$\Bbb Z$’, Adv. Math. 324 (2018), 326–335] showed that any 
$\ast $-homomorphism between Leavitt path algebras over 
$\mathbb Z$ is automatically diagonal preserving and hence induces an isomorphism of boundary path groupoids. His result works over conjugation-closed subrings of 
$\mathbb C$ enjoying certain properties. In this paper, we characterise the rings considered by Carlsen as precisely those rings for which every 
$\ast $-homomorphism of algebras of Hausdorff ample groupoids is automatically diagonal preserving. Moreover, the more general groupoid result has a simpler proof.
In this article, we introduce a hierarchy on the class of non-archimedean Polish groups that admit a compatible complete left-invariant metric. We denote this hierarchy by 
$\alpha $-CLI and L-
$\alpha $-CLI where 
$\alpha $ is a countable ordinal. We establish three results:
(1) G is 
$0$-CLI iff 
$G=\{1_G\}$;
(2) G is 
$1$-CLI iff G admits a compatible complete two-sided invariant metric; and
(3) G is L-
$\alpha $-CLI iff G is locally 
$\alpha $-CLI, i.e., G contains an open subgroup that is 
$\alpha $-CLI.
Subsequently, we show this hierarchy is proper by constructing non-archimedean CLI Polish groups 
$G_\alpha $ and 
$H_\alpha $ for 
$\alpha <\omega _1$, such that:
(1) 
$H_\alpha $ is 
$\alpha $-CLI but not L-
$\beta $-CLI for 
$\beta <\alpha $; and
(2) 
$G_\alpha $ is 
$(\alpha +1)$-CLI but not L-
$\alpha $-CLI.
$\mathcal D$-CLASS AND NON-HAUSDORFF UNIVERSAL GROUPOIDS
The complex algebra of an inverse semigroup with finitely many idempotents in each 
$\mathcal D$-class is stably finite by a result of Munn. This can be proved fairly easily using 
$C^{*}$-algebras for inverse semigroups satisfying this condition that have a Hausdorff universal groupoid, or more generally for direct limits of inverse semigroups satisfying this condition and having Hausdorff universal groupoids. It is not difficult to see that a finitely presented inverse semigroup with a non-Hausdorff universal groupoid cannot be a direct limit of inverse semigroups with Hausdorff universal groupoids. We construct here countably many nonisomorphic finitely presented inverse semigroups with finitely many idempotents in each 
$\mathcal D$-class and non-Hausdorff universal groupoids. At this time, there is not a clear 
$C^{*}$-algebraic technique to prove these inverse semigroups have stably finite complex algebras.
The endomorphism monoid of a model-theoretic structure carries two interesting topologies: on the one hand, the topology of pointwise convergence induced externally by the action of the endomorphisms on the domain via evaluation; on the other hand, the Zariski topology induced within the monoid by (non-)solutions to equations. For all concrete endomorphism monoids of 
$\omega $-categorical structures on which the Zariski topology has been analysed thus far, the two topologies were shown to coincide, in turn yielding that the pointwise topology is the coarsest Hausdorff semigroup topology on those endomorphism monoids.
We establish two systematic reasons for the two topologies to agree, formulated in terms of the model-complete core of the structure. Further, we give an example of an 
$\omega $-categorical structure on whose endomorphism monoid the topology of pointwise convergence and the Zariski topology differ, answering a question of Elliott, Jonušas, Mitchell, Péresse, and Pinsker.
Given a continuous and isometric action of a Polish group G on an adequate Polish topometric space 
$(X,\tau ,\rho )$ and 
$x \in X$, we find a necessary and sufficient condition for 
$\overline {Gx}^{\rho }$ to be co-meagre; we also obtain a criterion that characterizes when such a point exists. This work completes a criterion established in earlier work of the authors.
Hardin and Taylor proved that any function on the reals—even a nowhere continuous one—can be correctly predicted, based solely on its past behavior, at almost every point in time. They showed that one could even arrange for the predictors to be robust with respect to simple time shifts, and asked whether they could be robust with respect to other, more complicated time distortions. This question was partially answered by Bajpai and Velleman, who provided upper and lower frontiers (in the subgroup lattice of 
$\mathrm{Homeo}^+(\mathbb {R})$) on how robust a predictor can possibly be. We improve both frontiers, some of which reduce ultimately to consequences of Hölder’s Theorem (that every Archimedean group is abelian).
$\mathbb {N}^k$
-actions
We consider groupoids constructed from a finite number of commuting local homeomorphisms acting on a compact metric space and study generalized Ruelle operators and
$ C^{\ast } $
-algebras associated to these groupoids. We provide a new characterization of
$ 1 $
-cocycles on these groupoids taking values in a locally compact abelian group, given in terms of
$ k $
-tuples of continuous functions on the unit space satisfying certain canonical identities. Using this, we develop an extended Ruelle–Perron–Frobenius theory for dynamical systems of several commuting operators (
$ k $
-Ruelle triples and commuting Ruelle operators). Results on KMS states on
$ C^{\ast } $
-algebras constructed from these groupoids are derived. When the groupoids being studied come from higher-rank graphs, our results recover existence and uniqueness results for KMS states associated to the graphs.
