Here is a list of my publications. LaTeX files of the arxiv versions of my solo papers can be found here.
5. Kaplansky’s problem and unitary orbits in matrix amplifications
With Laurent Marcoux and Yuanhang Zhang, submitted. arxiv
abstract: We study the distances between the unitary orbits of matrix amplifications of elements in certain C*-algebras. In particular, we show that the distance between unitary orbits of arbitrary elements in unital, separable, UHF-stable C*-algebras remains unchanged when amplifying to certain matrix sizes. We further exhibit examples of elements in C*-algebras where the distance between unitary orbits becomes strictly smaller after amplifying by a certain matrix size, and we demonstrate that distances between unitary orbits of amplifications are not monotone in the multiplicity of the amplifications, even in the setting of matrix algebras. Lastly, we show that topological K-theory provides obstructions in the purely infinite setting.
4. Universal covering groups of unitary groups of von Neumann algebras
Studia Mathematica (2025). doi arxiv
abstract: We give a short and simple proof, utilizing the pre-determinant of P. de la Harpe and G. Skandalis, that the universal covering group of the unitary group of a $\text{II}_1$ von Neumann algebra $\mathcal{M}$, when equipped with the norm topology, splits algebraically as the direct product of the self-adjoint part of its center and the unitary group $U(\mathcal{M})$. Thus, when $\mathcal{M}$ is a $\text{II}_1$ factor, the universal covering group of $U(\mathcal{M})$ is algebraically isomorphic to the direct product $\mathbb{R} \times U(\mathcal{M})$. In particular, the question of P. de la Harpe and D. McDuff of whether the universal cover of $U(\mathcal{M})$ is a perfect group is answered in the negative.
3. Polar decomposition in algebraic K-theory
With Aaron Tikuisis, Journal of Operator Theory (2025). doi arxiv
abstract: We show that the Hausdorffized algebraic K-theory of a unital C*-algebra decomposes naturally as a direct sum of the Hausdorffized unitary algebraic K-theory and the space of continuous affine functions on the trace simplex. Under mild regularity hypotheses, an analogous natural direct sum decomposition holds for the ordinary (non-Hausdorffized) algebraic K-theory.
2. Tensorially absorbing inclusions of C*-algebras
Canadian Journal of Mathematics (2024). doi arxiv
abstract: When $\mathcal{D}$ is strongly self-absorbing we say an inclusion $B \subseteq A$ is $\mathcal{D}$-stable if it is isomorphic to the inclusion $B \otimes \mathcal{D} \subseteq A \otimes \mathcal{D}$. We give ultrapower characterizations and show that if a unital inclusion is $\mathcal{D}$-stable, then $\mathcal{D}$-stability can be exhibited for countably many intermediate C*-algebras concurrently. We show that such embeddings between $\mathcal{D}$-stable C*-algebras are point-norm dense in the set of all embeddings, and that every embedding between $\mathcal{D}$-stable C*-algebras is approximately unitarily equivalent to a $\mathcal{D}$-stable embedding. Examples are provided.
1. Unitary groups, K-theory and traces
Glasgow Mathematical Journal (2023). doi arxiv
abstract: We show that continuous group homomorphisms between unitary groups of unital C*-algebras induce maps between spaces of continuous real-valued affine functions on the trace simplices. Under certain $K$-theoretic regularity conditions, these maps can be seen to commute with the pairing between $K_0$ and traces. If the homomorphism is contractive and sends the unit circle to the unit circle, the map between spaces of continuous real-valued affine functions can further be shown to be unital and positive (up to a minus sign).
