2-Mode–Precaution model

In this study, we propose a new dynamical system model, referred to as the 2-Mode–Precaution model, to represent MRSA transmission pathways in the University of Virginia Hospital. This model extends a prior model, referred to as the 2-Mode–Susceptible-Infectious-Susceptible (SIS) epidemic model, ^{Reference Jang, Justice, Polgreen, Segre, Sewell and Pemmaraju13,Reference Cui, Cho, Kamruzzaman, Bielskas, Vullikanti and Prakash14} which has been proposed for capturing MRSA transmission dynamics but does not account for contact precautions. Our model includes 3 types of entities: patients, healthcare workers (HCWs), and locations. A key aspect of the model is the contact network, which specifies the contacts between patients and HCWs and the locations where these happen. This information is not directly available and is inferred from EHR data through tables (eg, medicine administration). Each patient in the hospital is in one of the following states: $S$ (susceptible), $C$ (carriage), ${S_{cp}}$ (susceptible, under contact precaution) and ${C_{cp}}$ (carriage, under contact precaution). Patients outside the hospital can be either in $S$ or $C$ states. Figure 1 shows the state transition diagram of the 2-mode–precaution model. HCWs and locations are only associated with pathogen load (so they can be considered as being in the carriage state).

Figure 1. The diagram of states for patients in the 2-Mode–Precaution model. There are 6 states in the 2-Mode-Precaution model: four for patients in the hospital (ie, $S$ , susceptible, out of contact precaution, $C$ , carriage, out of contact precaution, ${S_{cp}}$ , susceptible, under contact precaution, and ${C_{cp}}$ , carriage, under contact precaution) and 2 ( $S$ and $C$ ) are for patients outside the hospital, or in the community. Each patient, HCW, and location is associated with a pathogen load, which is transferred through contacts between people and locations. A patient is infected with a probability that depends on the load they have accumulated. Load on all entities decays at a steady rate.

Following the approach of previous research, ^{Reference Jang, Justice, Polgreen, Segre, Sewell and Pemmaraju13} the 2-Mode–Precaution model has 3 parts: (1) transfer of pathogen load between entities, (2) patient infection (based on their pathogen load), and (3) decay in load. We assumed that a contact between entities $i$ and $j$ results in transfer of pathogen load between them and averages the load between them. The entire set of pathogen-transfer events can be captured by application of a pathogen-transfer matrix constructed from the network. A patient moves from a susceptible state ( $S$ or ${S_{cp}}$ ) to a carriage state ( $C$ or ${C_{cp}}$ ) with a probability determined by a dose–response function. This probability increases with the patient’s pathogen load. Patients in the carriage state are assumed to shed at a higher rate. The shedding continues until the patient recovers.

A patient in state $S$ or $C$ moves to state ${S_{cp}}$ or ${C_{cp}}$ respectively, if they are in the hospital, and are put under contact precautions. For every patient under contact precaution (ie, in ${S_{cp}}$ and ${C_{cp}}$ ), contact precautions reduce the pathogen load transferred via contacts by an effectiveness factor ${\varphi _{edge}}$ (see Supplementary Material online for more details). Notably, the University of Virginia Hospital has no general policy for testing. Instead, the tests are performed based on the clinician’s request. Therefore, in this work, we assumed that the testing rates and parameters in the precaution model were captured in the transition probabilities between different states, which were calibrated from MRSA infection data. For instance, ${p_{C \to {C_{cp}}}}$ represents the transition probability from state $C$ to state ${C_{cp}}$ , corresponding to patients who tested positive for MRSA and were placed under contact precautions. Similarly, ${p_{{C_{cp}} \to C}}$ denotes the transition probability from state ${C_{cp}}$ to state $C$ , corresponding to patients who were wrongly released due to false-negative MRSA tests. Such assumptions are reasonable because the carriage state in the 2-Mode–SIS model can represent both MRSA-colonized and -infected patients. Undetected colonized MRSA cases may have existed due to undertesting, false negatives, and/or MRSA infections occurring after hospital discharge. We also included parameters to account for importation of cases, following existing research. ^{Reference Pei, Liljeros and Shaman15,Reference Pei, Morone, Liljeros, Makse and Shaman16} More details on the 2-Mode–Precaution model are provided in the Supplementary Material (online).

Parameter adjustment method

The most clinically significant parameter changes in the 2-Mode–Precaution model for estimating outcomes for different releasing polices are ${p_{{C_{cp}} \to C}}$ (the transition probability from ${C_{cp}}$ to $C$ ) and ${p_{{S_{cp}} \to S}}$ (transition probability from ${S_{cp}}$ to $S$ ). We denote the different policies as $p_{{C_{cp}} \to C}^{i - neg}$ , where i is the number of tests in the policy. Other non–precaution-based infection controls and prevention measures are assumed to remain constant (eg, terminal room disinfection, standard hand hygiene practices, antimicrobial use). For $p_{{C_{cp}} \to C}^{3 - neg}$ , only patients with 3 consecutive negative tests were released. Under the 2-negative policy ( $p_{{C_{cp}} \to C}^{2 - neg}$ ), patients with the first 2 tests negative were released without a third test. For $p_{{C_{cp}} \to C}^{1 - neg}$ , patients under contact precautions were released after a negative test. We used ${n_0}$ and ${n_1}$ to represent the number of records with 3 consecutive negative tests (ie, negative–negative–negative) and 2 negative test results followed by 1 positive result (ie, negative–negative–positive) in the EHR data set. With the 2-negative policy, ${n_1}$ more patients would be released. Hence, we have $p_{{C_{cp}} \to C}^{2neg} \approx {{{n_0} + {n_1}} \over {{n_0}}}\;p_{{C_{cp}} \to C}^{3neg}$ . Similarly, under the 3-negative policy, patients must wait for 3 consecutive negative tests to be released. However, under the 2-negative policy, patients only needed to wait for 2 consecutive negative tests, which indicated a shorter waiting time and hence a larger transfer probability. We used ${d_i}$ to capture the average number of days to obtain i number of consecutive negative tests after the initial positive test. By assuming that the average days follow a geometric distribution parameterized by ${p_{{S_{cp}} \to S}}$ , then $p_{{S_{cp}} \to S}^{3 - neg}$ and $p_{{S_{cp}} \to S}^{2 - neg}$ should be proportional to ${1 \over {{d_3}}}$ and ${1 \over {{d_2}}}$ . Therefore, we have $p_{{S_{cp}} \to S}^{2 - neg} \approx {{{d_3}} \over {{d_2}}}p_{{S_{cp}} \to S}^{3 - neg}$ . Similarly, we have $p_{{S_{cp}} \to S}^{1 - neg} \approx {{{d_3}} \over {{d_1}}}p_{{S_{cp}} \to S}^{3 - neg}$ . The exact value for ${n_0},\;{n_1},{d_3}$ , and ${d_2}$ are listed in the Supplementary Material (online).

Costs for different policies

To quantitatively examine the tradeoff between the number of additional MRSA cases and the number of precaution days saved under the relaxed policies, we calculated the total cost for different policies. We used costs reported in a retrospective study in a Canadian hospital from 2005 to 2010, ^{Reference Roth, Longpre and Coyle6} which provided the estimated treatment (eg, laboratory cost, infection control time, housekeeping) and precaution (eg, private room and length of stay cost per day) cost for colonized patients and infected patients (values were adjusted to 2010 Canadian dollars in that study). As the study mentions, 88.9% of cases were colonized. ^{Reference Coello, Glynn, Gaspar, Picazo and Fereres17} The treatment costs (which are different for these 2 patient groups) are derived from multiplying the number of MRSA patients by the treatment cost per patient. Finally, we converted their values to 2010 US dollars, ¹⁸ then we adjusted for inflation to 2023, ¹⁹ for a final estimated cost of treatment of $435.89 in 2023 for MRSA-colonized patients and $459.13 in 2023 for MRSA-infected patients.

The cost of precautions was similarly calculated by multiplying the number of precaution days (the total number of patients under precaution each day) by the precaution cost estimates from the literature. ^{Reference Roth, Longpre and Coyle6} After conversion, the estimated cost of precaution is $403.58 in 2023 for colonized patients and $2,110.90 in 2023 for infected patients. We focused only on the economic costs incurred by the University of Virginia Hospital. Patient costs, the downstream influence, and costs to the community or other healthcare facilities were not included.

Data set

We constructed heterogeneous contact networks using EHR data collected at the University of Virginia Hospital. These records combine inpatient data, doctor’s notes, and medication administration data, which document the location and time of interactions between patients and healthcare workers (HCWs). We then aggregated this information into daily networks, connecting 2 nodes (patients, HCWs, and locations) in the contact networks if they have at least 1 contact on a given day. From January 1, 2015, to December 31, 2019, the constructed networks included 41,216 patients, 14,392 healthcare workers, and 685 locations across all departments within the hospital. The weekly number of incident MRSA cases was obtained using both MRSA-positive cultures and PCR nares surveillance swabs. For removal of precautions, we only considered negative PCR results because negative culture tests are not used to remove individuals from contact precautions at the University of Virginia Hospital. From January 1, 2015, to December 31, 2019, 22,825 PCR tests were performed on 15,806 patients based on clinician orders. These tests resulted in 2,481 positive and 20,344 negative outcomes, with 1,800 unique patients having at least 1 positive test. Although not all patients in the hospital were tested, potential undetected or colonized patients are accounted for in the carriage state of our 2-Mode–Precaution model. Further details are available in the Supplementary Material (online).

Calibration and setup

As described in the introduction section, the University of Virginia Hospital employs a “3-negative policy” under which contact precautions are discontinued after 3 consecutive negative test results. Therefore, to infer the parameters for the 3-negative policy, we used the ensemble adjustment Kalman filter (EAKF), ^{Reference Anderson20} which has been widely used for epidemiological models of various healthcare-associated infections, including MRSA, and has demonstrated good performance. ^{Reference Pei, Morone, Liljeros, Makse and Shaman16,Reference Pei, Kandula and Shaman21,Reference Li, Pei and Chen22} Specifically, we calibrated the number of cases transferred from $C$ to ${C_{cp}}$ (ie, patients who were tested based on clinician orders and turned out to be positive) to the incident MRSA case numbers. Calibration was restricted to known incident hospital MRSA cases because incident cases outside the hospital are not recorded as part of the EHR data. The effectiveness of the calibration procedure on both synthetic data and real-world data is demonstrated in the Supplementary Material (online).

We used the parameter adjustment method to estimate the difference of outcomes between the current 3-negative policy and the potential 2- and 1-negative policies. We ran each simulation 300 times using these adjusted parameters to estimate outcomes, and we calculated the costs associated with each policy to compare their effectiveness.