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1. Practically and Theoretically Efficient Garbage Collection for Multiversioning

   https://doi.org/10.1145/3572848.3577508  

   Wei, Yuanhao; Blelloch, Guy E.; Fatourou, Panagiota; Ruppert, Eric (February 2023, Proceedings of the 28th ACM SIGPLAN Symposium on Principles and Practice of Parallel Programming)

   Multiversioning is widely used in databases, transactional memory, and concurrent data structures. It can be used to support read-only transactions that appear atomic in the presence of concurrent update operations. Any system that maintains multiple versions of each object needs a way of efficiently reclaiming them.We experimentally compare various existing reclamation techniques by applying them to a multiversion tree and a multiversion hash table. Using insights from these experiments, we develop two new multiversion garbage collection (MVGC) techniques. These techniques use two novel concurrent version list data structures. Our experimental evaluation shows that our fastest technique is competitive with the fastest existing MVGC techniques, while using significantly less space on some workloads. Our new techniques provide strong theoretical bounds, especially on space usage. These bounds ensure that the schemes have consistent performance, avoiding the very high worst-case space usage of other techniques. 

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2. Online List Labeling with Predictions

   McCauley, Samuel; Moseley, Benjamin; Niaparast, Aidin; Singh, Shikha (May 2024, Curran Associates Inc.)

   A growing line of work shows how learned predictions can be used to break through worst-cast barriers to improve the running time of an algorithm. However, incorporating predictions into data structures with strong theoretical guarantees remains underdeveloped. This paper takes a step in this direction by showing that predictions can be leveraged in the fundamental online list labeling problem. In the problem, n items arrive over time and must be stored in sorted order in an array of size Θ(n). The array slot of an element is its label and the goal is to maintain sorted order while minimizing the total number of elements moved (i.e., relabeled). We design a new list labeling data structure and bound its performance in two models. In the worst-case learning-augmented model, we give guarantees in terms of the error in the predictions. Our data structure provides strong theoretical guarantees— it is optimal for any prediction error and guarantees the best-known worst-case bound even when the predictions are entirely erroneous. We also consider a stochastic error model and bound the performance in terms of the expectation and variance of the error. Finally, the theoretical results are demonstrated empirically. In particular, we show that our data structure performs well on numerous real datasets, including temporal datasets where predictions are constructed from elements that arrived in the past (as is typically done in a practical use case). 

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3. Smoothed Analysis with Adaptive Adversaries

   https://doi.org/10.1145/3656638  

   Haghtalab, Nika; Roughgarden, Tim; Shetty, Abhishek (June 2024, Journal of the ACM)

   We prove novel algorithmic guarantees for several online problems in the smoothed analysis model. In this model, at each time step an adversary chooses an input distribution with density function bounded above pointwise by \(\tfrac{1}{\sigma }\)times that of the uniform distribution; nature then samples an input from this distribution. Here, σ is a parameter that interpolates between the extremes of worst-case and average case analysis. Crucially, our results hold foradaptiveadversaries that can base their choice of input distribution on the decisions of the algorithm and the realizations of the inputs in the previous time steps. An adaptive adversary can nontrivially correlate inputs at different time steps with each other and with the algorithm’s current state; this appears to rule out the standard proof approaches in smoothed analysis. This paper presents a general technique for proving smoothed algorithmic guarantees against adaptive adversaries, in effect reducing the setting of an adaptive adversary to the much simpler case of an oblivious adversary (i.e., an adversary that commits in advance to the entire sequence of input distributions). We apply this technique to prove strong smoothed guarantees for three different problems:(1)Online learning: We consider the online prediction problem, where instances are generated from an adaptive sequence of σ-smooth distributions and the hypothesis class has VC dimensiond. We bound the regret by\(\tilde{O}(\sqrt {T d\ln (1/\sigma)} + d\ln (T/\sigma))\)and provide a near-matching lower bound. Our result shows that under smoothed analysis, learnability against adaptive adversaries is characterized by the finiteness of the VC dimension. This is as opposed to the worst-case analysis, where online learnability is characterized by Littlestone dimension (which is infinite even in the extremely restricted case of one-dimensional threshold functions). Our results fully answer an open question of Rakhlin et al. [64].(2)Online discrepancy minimization: We consider the setting of the online Komlós problem, where the input is generated from an adaptive sequence of σ-smooth and isotropic distributions on the ℓ₂unit ball. We bound the ℓ_∞norm of the discrepancy vector by\(\tilde{O}(\ln ^2(\frac{nT}{\sigma }))\). This is as opposed to the worst-case analysis, where the tight discrepancy bound is\(\Theta (\sqrt {T/n})\). We show such\(\mathrm{polylog}(nT/\sigma)\)discrepancy guarantees are not achievable for non-isotropic σ-smooth distributions.(3)Dispersion in online optimization: We consider online optimization with piecewise Lipschitz functions where functions with ℓ discontinuities are chosen by a smoothed adaptive adversary and show that the resulting sequence is\(({\sigma }/{\sqrt {T\ell }}, \tilde{O}(\sqrt {T\ell }))\)-dispersed. That is, every ball of radius\({\sigma }/{\sqrt {T\ell }}\)is split by\(\tilde{O}(\sqrt {T\ell })\)of the partitions made by these functions. This result matches the dispersion parameters of Balcan et al. [13] for oblivious smooth adversaries, up to logarithmic factors. On the other hand, worst-case sequences are trivially (0,T)-dispersed.¹ 

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4. A Machine Learning Framework to Improve Storage System Performance

   https://doi.org/10.1145/3465332.3470875  

   Akgun, Ibrahim Umit; Aydin, Ali Selman; Shaikh, Aadil; Velikov, Lukas; Zadok, Erez (July 2021, Proceedings of the 13th ACM Workshop on Hot Topics in Storage (HotStorage '21))

   null (Ed.)

   Storage systems and their OS components are designed to accommodate a wide variety of applications and dynamic workloads. Storage components inside the OS contain various heuristic algorithms to provide high performance and adaptability for different workloads. These heuristics may be tunable via parameters, and some system calls allow users to optimize their system performance. These parameters are often predetermined based on experiments with limited applications and hardware. Thus, storage systems often run with these predetermined and possibly suboptimal values. Tuning these parameters manually is impractical: one needs an adaptive, intelligent system to handle dynamic and complex workloads. Machine learning (ML) techniques are capable of recognizing patterns, abstracting them, and making predictions on new data. ML can be a key component to optimize and adapt storage systems. In this position paper, we propose KML, an ML framework for storage systems. We implemented a prototype and demonstrated its capabilities on the well-known problem of tuning optimal readahead values. Our results show that KML has a small memory footprint, introduces negligible overhead, and yet enhances throughput by as much as 2.3x. 

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5. How Much Data Is Sufficient to Learn High-Performing Algorithms?

   https://doi.org/10.1145/3676278  

   Balcan, Maria-Florina; Deblasio, Dan; Dick, Travis; Kingsford, Carl; Sandholm, Tuomas; Vitercik, Ellen (October 2024, Journal of the ACM)

   Algorithms often have tunable parameters that impact performance metrics such as runtime and solution quality. For many algorithms used in practice, no parameter settings admit meaningful worst-case bounds, so the parameters are made available for the user to tune. Alternatively, parameters may be tuned implicitly within the proof of a worst-case approximation ratio or runtime bound. Worst-case instances, however, may be rare or nonexistent in practice. A growing body of research has demonstrated that a data-driven approach to parameter tuning can lead to significant improvements in performance. This approach uses atraining setof problem instances sampled from an unknown, application-specific distribution and returns a parameter setting with strong average performance on the training set. We provide techniques for derivinggeneralization guaranteesthat bound the difference between the algorithm’s average performance over the training set and its expected performance on the unknown distribution. Our results apply no matter how the parameters are tuned, be it via an automated or manual approach. The challenge is that for many types of algorithms, performance is a volatile function of the parameters: slightly perturbing the parameters can cause a large change in behavior. Prior research [e.g.,12,16,20,62] has proved generalization bounds by employing case-by-case analyses of greedy algorithms, clustering algorithms, integer programming algorithms, and selling mechanisms. We streamline these analyses with a general theorem that applies whenever an algorithm’s performance is a piecewise-constant, piecewise-linear, or—more generally—piecewise-structuredfunction of its parameters. Our results, which are tight up to logarithmic factors in the worst case, also imply novel bounds for configuring dynamic programming algorithms from computational biology. 

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