桃色视频

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Julian Hofstadler

Julian Hofstadler
Post Doctoral Researcher University of Bath
Focus - Monte Carlo methods 2025 鈥 Present

Mathematician working on the theory of Monte Carlo methods 鈥 convergence analysis of numerical algorithms involving randomness and quantitative error bounds for MCMC and SMC samplers. Within MaThRad I work with Alex Cox at the University of Bath on Markov chain based sampling algorithms for radiation transport, from adaptive MCMC theory to rigorous guarantees for the Monte Carlo codes used in reactor physics. PhD from the University of Passau on adaptive Markov chain Monte Carlo; MSc and BSc in Mathematics from Johannes Kepler University Linz.

Body of work

10 items
Year
Publication 2026

Stochastic Processes and their Applications 路 with K. 艁atuszy艅ski, G. O. Roberts & D. Rudolf
Establishes almost-sure convergence rates for adaptive increasingly rare MCMC 鈥 theoretical guarantees for a class of adaptive sampling algorithms used wherever MCMC is applied. Of relevance to any user of adaptive MCMC: the results certify that the sampler converges, and how fast.
  • 鈥 Preprint at .
  • 鈥 Follow-up preprint 鈥淓rror bounds for simultaneous Wasserstein contractive adaptive increasingly rare MCMC鈥 (with D. Rudolf, Jun 2026) extends the theory to error bounds 鈥 .
  • 鈥 Presented at the (Sep 2025).
Linked 路 DOI Adaptive MCMC Convergence rates
Preprint 2026 路 Feb

arXiv 路 sole author
A general framework, built on solutions of Poisson's equation, for proving convergence of Markov chains 鈥 with applications to sampling algorithms based on Markov chains such as MCMC and SMC. Improves the theoretical understanding of the samplers used across computational statistics and transport simulation.
Linked 路 arXiv Markov chains Poisson equation
Algorithm 2026 路 in progress

SMC sampler for Bayesian inverse problems with intractable likelihoods

International collaboration 路 with Alex Cox (Bath) & collaborators in Heidelberg
An algorithm producing samples for Bayesian inverse problems whose likelihoods are intractable 鈥 applicable to general inverse problems in particle transport, medical imaging and beyond. Code and a paper draft exist; numerical experiments run on the Heidelberg group's cluster, with submission to a journal as the next step.
  • 鈥 Co-designed through reciprocal research visits 鈥 Josef Martinek visiting Bath and Julian visiting Heidelberg.
Asserted SMC Bayesian inverse problems In progress
Theorem 2026 路 in progress

Theoretical guarantees for the Monte Carlo algorithms inside SCONE

MaThRad collaboration 路 University of Bath
Analysis of the explicit and implicit capture algorithms used within the SCONE neutron-transport code 鈥 rigorously proving that the sampling schemes nuclear engineers rely on actually work. A paper draft is in development.
Asserted Neutron transport SCONE In progress
Invited Seminar 2025 路 Dec

Optimal convergence rates of MCMC integration for functions with unbounded second moment

Scientific Computing Seminar 路 Heidelberg University
Invited seminar on Markov chain based Monte Carlo algorithms, including an accessible introduction to this class of methods for a broad applied-mathematics audience alongside recent convergence results.
Asserted MCMC Invited talk
Workshop 2025 路 May

MaThRad 脳 Sandia National Laboratories workshop

Sandia Labs 路 neutron transport
Participated in the joint MaThRad鈥揝andia workshop on open questions in neutron transportation, exploring candidate joint projects between the programme and Sandia's simulation teams.
Asserted International Neutron transport
Working group 2025 鈫 present

Member 鈥 MaThRad working groups on k-effective analysis and SMC for inverse problems

MaThRad internal 路 MaThRad 脳 Heidelberg
Member of two MaThRad working groups, both feeding technical reports into the programme: the k-effective analysis group, analysing the algorithms used within criticality calculations, and the SMC-for-Bayesian-inverse-problems group with Heidelberg, applying the programme's expertise to imaging problems beyond MaThRad.
  • 鈥 Also attended a workshop on Function Approximation and Probability in B臋dlewo (Sep 2025) to deepen the function-approximation side of the Monte Carlo toolkit.
Asserted Working group Criticality
Co-design pathway 2025 鈫 present

Adaptive-MCMC theory reaching its user community

University of Passau 路 University of 桃色视频 路 MCMC users
Adaptive MCMC is widely used but its theory lagged behind practice. The convergence-rate results co-designed with Passau and 桃色视频 close that gap, and dissemination to the MCMC user community is under way through conference talks and the published paper.
Impact trajectory
Theory built
Published
Disseminated
Adoption
  • 鈥 Presented to MCMC users at the Austrian Stochastics Days 2025.
  • 鈥 Exploratory sibling pathway: the Poisson-equation convergence framework targets the same community 鈥 draft available, not yet presented.
Linked 路 DOI Co-design MCMC
Assurance pathway 2025 鈫 present

Convergence proofs for SCONE's Monte Carlo algorithms

SCONE users 路 nuclear engineering
SCONE's capture algorithms are widely used but lack published convergence proofs. This analysis sets out to provide them 鈥 work that would matter to the nuclear engineers who rely on the code. It is currently a draft, shared so far within the programme at a MaThRad postdoc retreat.
Impact trajectory
Analysis drafted
Proofs complete
Shared with users
Integration
  • 鈥 Presented at the MaThRad postdoc retreat (Nov 2025).
Asserted SCONE Nuclear
Engagement pathway 2025 路 Oct

Exploring fusion applications with UKAEA

UKAEA 路 Culham
Presented current projects at the Culham workshop to explore how the programme's Monte Carlo theory could serve fusion research, opening a channel to UKAEA for future collaboration on fusion-relevant transport problems.
Impact trajectory
Contact made
Engaged
Joint project
Adoption
Asserted Fusion UKAEA

Output over time

2025 鈥 2026
2025
2026
Research
Joined MaThRad 路 Monte Carlo theory thread
Adaptive-MCMC paper revised for SPA
Austrian Stochastics Days talk (Sep)
Heidelberg invited seminar (Dec)
Adaptive-MCMC paper published in SPA
Poisson-equation preprint 路 arXiv (Feb)
Error-bounds follow-up preprint 路 arXiv (Jun)
SMC for inverse problems 路 paper target
SCONE guarantees 路 paper target
Collab
Sandia 脳 MaThRad workshop (May)
B臋dlewo function-approximation workshop (Sep)
Joined k-effective & SMC working groups
Heidelberg research visits
Impact
Culham workshop 路 UKAEA engagement (Oct)
SCONE analysis at postdoc retreat (Nov)

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