The Symposium on Compositional Structures is a nice informal conference series that happens more than once a year. You can now submit talks for this one.
• Ninth Symposium on Compositional Structures (SYCO 9), Como, Italy, 8-9 September 2022. Deadline to submit a talk: Monday 1 August 2022.
Apparently you can attend online but to give a talk you have to go there. Here are some details:
The Symposium on Compositional Structures (SYCO) is an interdisciplinary series of meetings aiming to support the growing community of researchers interested in the phenomenon of compositionality, from both applied and abstract perspectives, and in particular where category theory serves as a unifying common language. Previous SYCO events have been held in Birmingham, Strathclyde, Oxford, Chapman, Leicester and Tallinn.
We welcome submissions from researchers across computer science, mathematics, physics, philosophy, and beyond, with the aim of fostering friendly discussion, disseminating new ideas, and spreading knowledge between fields. Submission is encouraged for both mature research and work in progress, and by both established academics and junior researchers, including students. Submissions is easy, with no formatting or page restrictions. The meeting does not have proceedings, so work can be submitted even if it has been submitted or published elsewhere. You could submit work-in-progress, or a recently completed paper, or even a PhD or Masters thesis.
While no list of topics could be exhaustive, SYCO welcomes submissions with a compositional focus related to any of the following areas, in particular from the perspective of category theory:
• logical methods in computer science, including classical and quantum programming, type theory, concurrency, natural language processing and machine learning;
• graphical calculi, including string diagrams, Petri nets and reaction networks;
• languages and frameworks, including process algebras, proof nets, type theory and game semantics;
• abstract algebra and pure category theory, including monoidal category theory, higher category theory, operads, polygraphs, and relationships to homotopy theory;
• quantum algebra, including quantum computation and representation theory;
• tools and techniques, including rewriting, formal proofs and proof assistants, and game theory;
• industrial applications, including case studies and real-world problem descriptions.
Important dates
All deadlines are 23:59 Anywhere on Earth.
Submission deadline: Monday 1 August
Author notification: Monday 8 August 2022
Symposium dates: Thursday 8 and Friday 9 September 2022
Submission instructions
Submissions are by EasyChair, via the SYCO 9 submission page:
• https://easychair.org/my/conference?conf=syco9
Submission is easy, with no format requirements or page restrictions. The meeting does not have proceedings, so work can be submitted even if it has been submitted or published elsewhere. Think creatively: you could submit a recent paper, or notes on work in progress, or even a recent Masters or PhD thesis.
In the event that more good-quality submissions are received than can be accommodated in the timetable, the programme committee may choose to defer some submissions to a future meeting, rather than reject them. Deferred submissions can be re-submitted to any future SYCO meeting, where they will not need peer review, and where they will be prioritised for inclusion in the programme. Meetings will be held sufficiently frequently to avoid a backlog of deferred papers.
If you have a submission which was deferred from a previous SYCO meeting, it will not automatically be considered for SYCO 9; you still need to submit it again through EasyChair. When submitting, append the words “DEFERRED FROM SYCO X” to the title of your paper, replacing “X” with the appropriate meeting number. There is no need to attach any documents.
Programme committee
The PC chair is John van de Wetering, Radboud University. The Programme Committee will be announced soon.
Steering committee
Ross Duncan, University of Strathclyde
Chris Heunen, University of Edinburgh
Dominic Horsman, University of Oxford
Aleks Kissinger, University of Oxford
Samuel Mimram, École Polytechnique
Simona Paoli, University of Aberdeen
Mehrnoosh Sadrzadeh, University College London
Pawel Sobocinski, Tallinn University of Technology
Jamie Vicary, University of Cambridge
Posted by John Baez 
is invertible if there’s an object 
with 
, where 
is the unit for the tensor product.)
of isomorphism classes of objects, and
of automorphisms of the unit object 
is a ‘3-cocycle’ on the group 
.![[a] \in H^3(G,A)](https://s0.wp.com/latex.php?latex=%5Ba%5D+%5Cin+H%5E3%28G%2CA%29&bg=ffffff&fg=333333&s=0&c=20201002)
. This is often called the ‘Sính invariant’, though I believe Hoàng is her surname, not Sính.
, has a fundamental group. But it also has a fundamental 2-group! This 2-group has 
and 
. And if all the higher homotopy groups of 
for 
. They are just 2-groups!
![S \colon X \to [-\infty, \infty]](https://s0.wp.com/latex.php?latex=S+%5Ccolon+X+%5Cto+%5B-%5Cinfty%2C+%5Cinfty%5D&bg=ffffff&fg=333333&s=0&c=20201002)
saying the entropy of each state. We also gave examples of thermostatic systems.
we need to use a ‘parameterized constraint’, a convex subset
,
is some other convex set. We end up with a thermostatic system on ![S \colon Y \to [-\infty,\infty]](https://s0.wp.com/latex.php?latex=S+%5Ccolon+Y+%5Cto+%5B-%5Cinfty%2C%5Cinfty%5D&bg=ffffff&fg=333333&s=0&c=20201002)
defined by
which has convex sets as its types, and convex relations as its morphisms. Then we will make an operad algebra that assigns to any convex set ![S \colon X \to [-\infty,\infty]](https://s0.wp.com/latex.php?latex=S+%5Ccolon+X+%5Cto+%5B-%5Cinfty%2C%5Cinfty%5D&bg=ffffff&fg=333333&s=0&c=20201002)
to form an entropy function on 
which has convex sets as its objects and convex relations as its morphisms. This symmetric monoidal category has 
(the category of convex sets and convex-linear functions) as a subcategory with all the same objects, and 
inherits a symmetric monoidal structure from the bigger category 
from 
defined as follows. On objects, ![\mathrm{Ent}(X) = \{ S \colon X \to [-\infty,\infty] \mid S \: \text{is concave} \}](https://s0.wp.com/latex.php?latex=%5Cmathrm%7BEnt%7D%28X%29+%3D+%5C%7B+S+%5Ccolon+X+%5Cto+%5B-%5Cinfty%2C%5Cinfty%5D+%5Cmid+S+%5C%3A+%5Ctext%7Bis+concave%7D+%5C%7D&bg=ffffff&fg=333333&s=0&c=20201002)
produces an entropy function on 
by summing an entropy function on 
and an entropy function on 
:
, with coordinates 
representing energy, volume, and number of particles respectively. Let 
be the coordinates for the left-hand gas, and 
be the coordinates for the right-hand gas. Then as the two gases move to thermodynamic equilibrium, the conserved quantities are 
, 
, 
and 
. We picture this with the following diagram.
![S_1,S_2 \colon \mathbb{R}^3_{> 0} \to [-\infty, \infty]](https://s0.wp.com/latex.php?latex=S_1%2CS_2+%5Ccolon+%5Cmathbb%7BR%7D%5E3_%7B%3E+0%7D+%5Cto+%5B-%5Cinfty%2C+%5Cinfty%5D&bg=ffffff&fg=333333&s=0&c=20201002)
on the two inner systems (the two ideal gases), and get an entropy function ![S^e \colon \mathbb{R}^4_{> 0} \to [-\infty,\infty]](https://s0.wp.com/latex.php?latex=S%5Ee+%5Ccolon+%5Cmathbb%7BR%7D%5E4_%7B%3E+0%7D+%5Cto+%5B-%5Cinfty%2C%5Cinfty%5D&bg=ffffff&fg=333333&s=0&c=20201002)
on the outer system.
are such that the temperature and pressure equilibriate between the two ideal gases. This is because constrained maximization with the constraint 
and 
are the respective temperatures), and
and 
are the respective pressures).
Azimuth 